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Applied Optics

Applied Optics

APPLICATIONS-CENTERED RESEARCH IN OPTICS

  • Editor: James C. Wyant
  • Vol. 46, Iss. 20 — Jul. 10, 2007
  • pp: 4501–4514
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Requirements for discrete actuator and segmented wavefront correctors for aberration compensation in two large populations of human eyes

Nathan Doble, Donald T. Miller, Geunyoung Yoon, and David R. Williams  »View Author Affiliations


Applied Optics, Vol. 46, Issue 20, pp. 4501-4514 (2007)
http://dx.doi.org/10.1364/AO.46.004501


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Abstract

Numerous types of wavefront correctors have been employed in adaptive optics (AO) systems for correcting the ocular wavefront aberration. While all have improved image quality, none have yielded diffraction-limited imaging for large pupils ( 6 mm ) , where the aberrations are most severe and the benefit of AO the greatest. To this end, we modeled the performance of discrete actuator, segmented piston-only, and segmented piston∕tip∕tilt wavefront correctors in conjunction with wavefront aberrations measured on normal human eyes in two large populations. The wavefront error was found to be as large as 53 μm , depending heavily on the pupil diameter ( 2 7.5 mm ) and the particular refractive state. The required actuator number for diffraction-limited imaging was determined for three pupil sizes (4.5, 6, and 7.5 mm ), three second-order aberration states, and four imaging wavelengths (0.4, 0.6, 0.8, and 1.0 μm ). The number across the pupil varied from only a few actuators in the discrete case to greater than 100 for the piston-only corrector. The results presented will help guide the development of wavefront correctors for the next generation of ophthalmic instrumentation.

© 2007 Optical Society of America

1. Introduction

The optical resolution of the eye is fundamentally limited by the wave aberrations intrinsic to the cornea and crystalline lens and diffraction due to the finite size of the eye's pupil. Conventional corrective methods such as spectacles, contact lenses, and refractive surgery provide a static amelioration of low-order sphere and cylinder. However, ocular image quality can be significantly improved by dilating the pupil to minimize diffraction and correcting the aberrations across the larger pupil, for example, using an adaptive optics (AO) system [1

1. J. Liang, D. R. Williams, and D. T. Miller, “Supernormal vision and high-resolution retinal imaging through adaptive optics,” J. Opt. Soc. Am. A 14, 2884–2892 (1997). [CrossRef]

].

AO has been successfully integrated into a variety of retina camera modalities, including conventional fundus cameras [1

1. J. Liang, D. R. Williams, and D. T. Miller, “Supernormal vision and high-resolution retinal imaging through adaptive optics,” J. Opt. Soc. Am. A 14, 2884–2892 (1997). [CrossRef]

, 2

2. H. Hofer, L. Chen, G. Y. Yoon, B. Singer, Y. Yamauchi, and D. R. Williams, “Improvement in retinal image quality with dynamic correction of the eye's aberrations,” Opt. Express 8, 631–643 (2001). [CrossRef] [PubMed]

, 3

3. V. Larichev, P. V. Ivanov, N. G. Iroshnikov, V. I. Shmalhauzen, and L. J. Otten, “Adaptive system for eye-fundus imaging,” Quantum Electron. 32, 902–908 (2002). [CrossRef]

, 4

4. N. Ling, Y. Zhang, X. Rao, X. Li, C. Wang, Y. Hu, and W. Jiang, “Small table-top adaptive optical systems for human retinal imaging,” Proc. SPIE 4825, 99–108 (2002). [CrossRef]

, 5

5. M. Glanc, E. Gendron, F. Lacombe, D. Lafaille, J. F. Le Gargasson, and P. Lena, “Towards wide-field imaging with adaptive optics,” Opt. Commun. 230, 225–238 (2004). [CrossRef]

, 6

6. J. Rha, R. S. Jonnal, K. E. Thorn, J. Qu, Y. Zhang, and D. T. Miller, “Adaptive optics flood-illumination camera for high speed retinal imaging,” Opt. Express 14, 4552–4569 (2006). [CrossRef] [PubMed]

, 7

7. S. S. Choi, N. Doble, J. L. Hardy, S. M. Jones, J. L. Keltner, S. S. Olivier, and J. S. Werner, “In vivo imaging of the photoreceptor mosaic in retinal dystrophies and correlations with retinal function,” Invest. Ophthalmol. Visual Sci. 47, 2080–2092 (2006). [CrossRef]

], confocal scanning laser ophthalmoscopes (cSLO) [8

8. A. W. Dreher, J. F. Bille, and R. N. Weinreb, “Active optical depth resolution improvement of the laser tomographic scanner,” Appl. Opt. 28, 804–808 (1989). [CrossRef] [PubMed]

, 9

9. A. Roorda, F. Romero-Borja, W. J. Donnelly, H. Queener, T. J. Hebert, and M. C. W. Campbell, “Adaptive optics scanning laser ophthalmoscopy,” Opt. Express 10, 405–412 (2002). [PubMed]

, 10

10. D. X. Hammer, R. D. Ferguson, C. E. Bigelow, N. V. Iftimia, T. E. Ustun, and S. A. Burns, “Adaptive optics scanning laser ophthalmoscope for stabilized retinal imaging,” Opt. Express 8, 3354–3367 (2006). [CrossRef]

], and optical coherence tomography (OCT) [11

11. D. T. Miller, J. Qu, R. S. Jonnal, and K. Thorn, “Coherence gating and adaptive optics in the eye,” Proc. SPIE 4956, 65–72 (2003). [CrossRef]

, 12

12. B. Hermann, E. J. Fernandez, A. Unterhuber, H. Sattmann, A. F. Fercher, W. Drexler, P. M. Prieto, and P. Artal, “Adaptive-optics ultrahigh-resolution optical coherence tomography,” Opt. Lett. 29, 2142–2144 (2004). [CrossRef] [PubMed]

, 13

13. Y. Zhang, J. Rha, R. S. Jonnal, and D. T. Miller, “Adaptive optics parallel spectral domain optical coherence tomography for imaging the living retina,” Opt. Express 13, 4792–4811 (2005). [CrossRef] [PubMed]

, 14

14. R. J. Zawadzki, S. Jones, S. S. Olivier, M. Zhao, B. A. Bower, J. A. Izatt, S. S. Choi, S. Laut, and J. S. Werner, “Adaptive-optics optical coherence tomography for high-resolution and high-speed 3D retinal in vivo imaging,” Opt. Express 13, 8532–8546 (2005). [CrossRef] [PubMed]

, 15

15. Y. Zhang, B. Cense, J. Rha, R. S. Jonnal, W. Gao, R. J. Zawadzki, J. S. Werner, S. Jones, S. Olivier, and D. T. Miller, “High-speed volumetric imaging of cone photoreceptors with adaptive optics spectral-domain optical coherence tomography,” Opt. Express 14, 4380–4394 (2006). [CrossRef] [PubMed]

, 16

16. E. J. Fernández, B. Považvay, B. Hermann, A. Unterhuber, H. Sattmann, P. M. Prieto, R. Leitgeb, P. Ahnelt, P. Artal, and W. Drexler, “Three-dimensional adaptive optics ultrahigh-resolution optical coherence tomography using a liquid crystal spatial light modulator,” Vision Res. 45, 3432–3444 (2005). [CrossRef] [PubMed]

, 17

17. D. Merino, C. Dainty, A. Bradu, and A. G. Podoleanu, “Adaptive optics enhanced simultaneous en-face optical coherence tomography and scanning laser ophthalmoscopy,” Opt. Express 8, 3345–3353 (2006). [CrossRef]

]. The technique enables routine, in vivo observation of retinal structure at the cellular level, structure that could not otherwise be seen. AO has also been used to explore the limits of human visual acuity [18

18. G. Y. Yoon and D. R. Williams, “Visual performance after correcting the monochromatic and chromatic aberrations of the eye,” J. Opt. Soc. Am. A 19, 266–275 (2002). [CrossRef]

] and to control the type and amount of aberrations to which the retina is exposed [19

19. P. Artal, L. Chen, E. J. Fernández, B. Singer, S. Manzanera, and D. R. Williams, “Neural compensation for the eye's optical aberrations,” J. Vision 4, 281–287 (2004). [CrossRef]

, 20

20. L. Chen, P. B. Kruger, H. Hofer, B. Singer, and D. R. Williams, “Accommodation with higher-order monochromatic aberrations corrected with adaptive optics,” J. Opt. Soc. Am. A 23, 1–8 (2006). [CrossRef]

]. For design considerations and a review of results using AO in vision science the reader is directed to Refs. 21 and 22.

The effectiveness of AO fundamentally depends on its ability to measure, track, and correct the ocular aberrations. Performance of the last step is largely dictated by the AO system's key component, its wavefront corrector. This device dynamically imparts an ideally conjugate aberration profile onto the passing wavefront, thus canceling the original aberrations. Numerous types of wavefront correctors have been employed in AO systems for the eye, but none have yielded diffraction-limited imaging for large pupils (6mm). One problem is that the characteristics of the wavefront corrector necessary to achieve diffraction-limited imaging in the human eye are not well understood. Consequently, correctors have been employed somewhat arbitrarily with the expectation that image quality will improve, the extent of which is empirically determined.

Additionally, many of the wavefront correctors applied to the eye have been developed primarily for compensation of atmospheric turbulence. A common example being macroscopic discrete actuator deformable mirrors (DMs), such as those manufactured by Xinetics Inc. [23

23. B. R Oppenheimer, D. L. Palmer, R. G. Dekany, A. Sivaramakrishnan, M. A. Ealey, and T. R. Price, “Investigating a Xinetics Inc. deformable mirror,” Proc. SPIE 3126, 569–579 (1997). [CrossRef]

]. Specifically, their actuator number, stroke, influence functions, and speed have been tailored to the spatial and temporal properties of the atmosphere [24

24. J. W. Hardy, Adaptive Optics for Astronomical Telescopes (Oxford U. Press, 1998).

, 25

25. R. K. Tyson, Principles of Adaptive Optics, 2nd ed. (Academic, 1998).

] rather than that of the eye [26

26. H. Hofer, P. Artal, B. Singer, J. L. Aragon, and D. R. Williams, “Dynamics of the eye's wave aberration,” J. Opt. Soc. Am. A 18, 497–506 (2001). [CrossRef]

, 27

27. L. Diaz-Santana, C. Torti, I. Munro, P. Gasson, and C. Dainty, “Benefit of higher closed-loop bandwidths in ocular adaptive optics,” Opt. Express 11, 2597–2605 (2003). [CrossRef] [PubMed]

]. The high temporal fluctuations of atmospheric turbulence are roughly 2 orders greater than the microfluctuations in the eye; also their dynamic range is often too small for compensation of ocular aberrations. While wavefront correctors represent a small fraction of the total cost of ground-based telescopes in which they are employed, they represent a significant fraction of the total cost of most commercial retina cameras. Atmospheric wavefront correctors are also generally bulky, with large mirror surfaces (approximately several centimeters or more) that require long focal length relay optics to magnify the pupil of the eye. A smaller corrector comparable with the dilated pupil of the eye (48mm) can substantially reduce the instrument size and is commercially attractive.

Alternative wavefront corrector technologies, which are more cost effective and smaller, have been explored. Burns et al. [28

28. S. A. Burns, S. Marcos, A. E. Elsner, and S. Bara, “Contrast improvement for confocal retinal imaging using phase correcting plates,” Opt. Lett. 27, 400–402 (2002). [CrossRef]

] evaluated a customized phase plate to correct static higher-order aberrations for a cSLO. Significant improvement, however, can be realized if the correction is performed dynamically [2

2. H. Hofer, L. Chen, G. Y. Yoon, B. Singer, Y. Yamauchi, and D. R. Williams, “Improvement in retinal image quality with dynamic correction of the eye's aberrations,” Opt. Express 8, 631–643 (2001). [CrossRef] [PubMed]

]. Various types of dynamic wavefront correctors have hence been applied to the eye. Bimorph mirrors [24

24. J. W. Hardy, Adaptive Optics for Astronomical Telescopes (Oxford U. Press, 1998).

, 25

25. R. K. Tyson, Principles of Adaptive Optics, 2nd ed. (Academic, 1998).

] having 13–35 actuators have been investigated by several groups [3

3. V. Larichev, P. V. Ivanov, N. G. Iroshnikov, V. I. Shmalhauzen, and L. J. Otten, “Adaptive system for eye-fundus imaging,” Quantum Electron. 32, 902–908 (2002). [CrossRef]

, 4

4. N. Ling, Y. Zhang, X. Rao, X. Li, C. Wang, Y. Hu, and W. Jiang, “Small table-top adaptive optical systems for human retinal imaging,” Proc. SPIE 4825, 99–108 (2002). [CrossRef]

, 5

5. M. Glanc, E. Gendron, F. Lacombe, D. Lafaille, J. F. Le Gargasson, and P. Lena, “Towards wide-field imaging with adaptive optics,” Opt. Commun. 230, 225–238 (2004). [CrossRef]

, 14

14. R. J. Zawadzki, S. Jones, S. S. Olivier, M. Zhao, B. A. Bower, J. A. Izatt, S. S. Choi, S. Laut, and J. S. Werner, “Adaptive-optics optical coherence tomography for high-resolution and high-speed 3D retinal in vivo imaging,” Opt. Express 13, 8532–8546 (2005). [CrossRef] [PubMed]

, 15

15. Y. Zhang, B. Cense, J. Rha, R. S. Jonnal, W. Gao, R. J. Zawadzki, J. S. Werner, S. Jones, S. Olivier, and D. T. Miller, “High-speed volumetric imaging of cone photoreceptors with adaptive optics spectral-domain optical coherence tomography,” Opt. Express 14, 4380–4394 (2006). [CrossRef] [PubMed]

]. Recently, Fernandez et al. [29

29. E. J. Fernandez, L. Vabre, B. Hermann, A. Unterhuber, B. Povazay, and W. Drexler, “Adaptive optics with a magnetic deformable mirror: applications in the human eye,” Opt. Express 14, 8900–8917 (2006). [CrossRef] [PubMed]

] evaluated a magnetic membrane mirror with 52 actuators. Microelectromechanical systems (MEMS) [30

30. N. Doble and D. R. Williams, “The application of MEMS technology for adaptive optics in vision science,” IEEE J. Sel. Top. Quantum Electron. 10, 629–635 (2004). [CrossRef]

], promises batch fabrication of low cost, compact wavefront correctors. Bulk micromachined membrane MEMS mirrors [31

31. G. V. Vdovin and P. M. Sarro, “Flexible mirror micromachined in silicon,” Appl. Opt. 34, 2968–2972 (1995). [CrossRef] [PubMed]

] employing 37 electrodes have been successfully applied to the eye [32

32. E. J. Fernandez and P. Artal, “Membrane deformable mirror for adaptive optics: performance limits in visual optics,” Opt. Express 11, 1056–1069 (2003). [CrossRef] [PubMed]

, 33

33. E. J. Fernandez, I. Iglesias, and P. Artal, “Closed-loop adaptive optics in the human eye,” Opt. Lett. 26, 746–748 (2001). [CrossRef]

, 34

34. D.-U. Bartsch, L. Zhu, P. C. Sun, S. Fainman, and W. R. Freeman, “Retinal imaging with a low-cost micromachined membrane deformable mirror,” J. Biomedical Opt. 7, 451–456 (2002). [CrossRef]

]. Although both bimorph and membrane mirrors have a large dynamic range (8 and 16μm, respectively [32

32. E. J. Fernandez and P. Artal, “Membrane deformable mirror for adaptive optics: performance limits in visual optics,” Opt. Express 11, 1056–1069 (2003). [CrossRef] [PubMed]

, 35

35. E. Dalimier and C. Dainty, “Comparative analysis of deformable mirrors for ocular adaptive optics,” Opt. Express 13, 4275–4285 (2005). [CrossRef] [PubMed]

]) for low-order aberrations, this falls rapidly with increasing spatial frequency. For an analysis of several commercial bimorph and bulk micromachined MEMS mirrors for the eye, see Dalimier and Dainty [35

35. E. Dalimier and C. Dainty, “Comparative analysis of deformable mirrors for ocular adaptive optics,” Opt. Express 13, 4275–4285 (2005). [CrossRef] [PubMed]

].

Surface micromachined devices [30

30. N. Doble and D. R. Williams, “The application of MEMS technology for adaptive optics in vision science,” IEEE J. Sel. Top. Quantum Electron. 10, 629–635 (2004). [CrossRef]

] are another class of MEMS mirror whose mode of operation is comparable with discrete actuator DMs. Doble et al. [36

36. N. Doble, G. Yoon, L. Chen, P. Bierden, B. Singer, S. Olivier, and D. R. Williams, “The use of a microelectromechanical mirror for adaptive optics in the human eye,” Opt. Lett. 27, 1579–1581 (2002). [CrossRef]

] employed a surface micromachined MEMS DM [37

37. J. A. Perreault, T. G. Bifano, B. M. Levine, and M. N. Horenstein, “Adaptive optic correction using microelectromechanical deformable mirrors,” Opt. Eng. 41, 561–566 (2002). [CrossRef]

] and successfully imaged human cone photoreceptors, demonstrating that wavefront correctors other than the macroscopic form are capable of this task.

Liquid-crystal spatial light modulators (LC-SLMs) are an alternative wavefront corrector technology. Transmissive, pixelated designs with 69 and 127 pixels were examined by Thibos and Bradley [38

38. L. N. Thibos and A. Bradley, “Use of liquid-crystal adaptive-optics to alter the refractive state of the eye,” Optom. Vision Sci. 74, 581–587 (1997). [CrossRef]

] and Vargas et al. [39

39. F. Vargas-Martin, P. M. Prieto, and P. Artal, “Correction of the aberrations in the human eye with a liquid-crystal spatial light modulator: limits to performance,” J. Opt. Soc. Am. A 15, 2552–2562 (1998). [CrossRef]

], respectively. Prieto et al. [40

40. P. M. Prieto, E. J. Fernandez, S. Manzanera, and P. Artal, “Adaptive optics with a programmable phase modulator: applications in the human eye,” Opt. Express 12, 4059–4071 (2004). [CrossRef] [PubMed]

] and Fernández et al. [16

16. E. J. Fernández, B. Považvay, B. Hermann, A. Unterhuber, H. Sattmann, P. M. Prieto, R. Leitgeb, P. Ahnelt, P. Artal, and W. Drexler, “Three-dimensional adaptive optics ultrahigh-resolution optical coherence tomography using a liquid crystal spatial light modulator,” Vision Res. 45, 3432–3444 (2005). [CrossRef] [PubMed]

] used an optically addressed LC-SLM [41

41. F. H. Li, N. Mukohzaka, N. Yoshida, Y. Igasaki, H. Toyoda, T. Inoue, Y. Kobayashi, and T Hara, “Phase modulation characteristics analysis of optically-addressed parallel-aligned nematic liquid crystal phase-only spatial light modulator combined with a liquid crystal display,” Opt. Rev. 5, 174–178 (1998). [CrossRef]

]. Such devices have high spatial resolution (480×480 piston-only pixels) and low control voltages (5 V) but are limited to phase-modulating polarized light with typical modulation confined to 2π. Phase wrapping [38

38. L. N. Thibos and A. Bradley, “Use of liquid-crystal adaptive-optics to alter the refractive state of the eye,” Optom. Vision Sci. 74, 581–587 (1997). [CrossRef]

, 42

42. D. T. Miller, L. N. Thibos, and X. Hong, “Requirements for segmented correctors for diffraction-limited performance in the human eye,” Opt. Express 13, 275–289 (2005). [CrossRef] [PubMed]

] must be used to extend their dynamic range.

While most of these correctors hold considerable promise for vision science, it remains unclear what the optimal parameters are to achieve a specified performance level in the eye, e.g., diffraction-limited imaging. Miller et al. [42

42. D. T. Miller, L. N. Thibos, and X. Hong, “Requirements for segmented correctors for diffraction-limited performance in the human eye,” Opt. Express 13, 275–289 (2005). [CrossRef] [PubMed]

] provided a performance evaluation of piston-only segmented wavefront correctors using a limited population of 12 human eyes. Here we considerably extend this analysis to cover two separate large populations, each comprising 70 eyes. Two additional wavefront correctors, discrete actuator and piston∕tip∕tilt segmented devices are also examined. Required actuator stroke and number for diffraction-limited imaging is determined for various pupil sizes, second-order aberration states, and imaging wavelengths.

2. Methods

2A. Description of the Two Populations

AO systems are used on a range of normal and pathologic eyes, and under different refractive conditions. As a first step to capture these differences in normal healthy eyes, our corrector analysis incorporated two large population studies.

The second population study, described by Thibos et al. [44

44. L. N. Thibos, X. Hong, A. Bradley, and X. Cheng, “Statistical variation of aberration structure and image quality in a normal population of healthy eyes,” J. Opt. Soc. Am. A 19, 2329–2348 (2002). [CrossRef]

], involved 100 individuals drawn from the student body and faculty at the Indiana University School of Optometry. The Shack–Hartmann wavefront sensor in this study used a lenslet array with a 600μm pitch (referenced to the plane of the eye's pupil) and a focal length of 24mm. The wavefront sensor CCD camera was a MCD600 (Spectra-Source Instruments) with 1340×1037 pixels (6.8μm×6.8μm pixels). All measurements were acquired at a wavelength of 633nm. The mean age was 26.1 years with a standard deviation of 5.6 years. The range of spherical equivalent errors was 10 to +5.5  D with a mean of 3.1  D and a standard deviation of 3.0 D. The magnitude of cylinder ranged from 0 to 1.75 D with a mean of 0.3 D and a standard deviation of 0.38 D. From this population, 70 right eyes with pupil diameters of 7.5mm were selected for our wavefront corrector analysis. Subjects were dilated and accommodation paralyzed by administration of cyclopentalate (0.5%, 1 drop). Aberrometry was performed with a laboratory Shack–Hartmann wavefront sensor in conjunction with trial lenses that were predetermined by a subjective refraction. A bite bar was used to stabilize the head. A minimum of three wavefront measurements were collected on each subject. Zernike modes up through tenth radial order were reconstructed by the method of least squares. Additional details can be found in Thibos et al. [44

44. L. N. Thibos, X. Hong, A. Bradley, and X. Cheng, “Statistical variation of aberration structure and image quality in a normal population of healthy eyes,” J. Opt. Soc. Am. A 19, 2329–2348 (2002). [CrossRef]

].

When evaluating the three wavefront corrector types, three second-order aberrations states were considered: (i) all three second-order modes took their measured values, (ii) the defocus coefficient was set to zero, and (iii) all three second-order Zernike coefficients were set to zero. The motivation being that second-order aberrations almost always dominate the total wavefront error, yet their magnitude varies considerably depending on the refractive state of the subject and the manner in which trial lenses or translating lenses are applied. Collectively, these six scenarios (two populations, each with three second-order conditions) traverse a wide range of aberration strengths that are encountered in most imaging and vision experiments.

Note that both measured population data sets represent essentially static wave aberrations and therefore do not capture the temporal behavior of the ocular media. As such, the temporal responses of the wavefront correctors were not assessed in our modeling. This is not a fundamental limitation, however, as these devices (with the exception of LC-SLMs) have resonant frequencies well above the temporal dynamics of the eye's aberrations [26

26. H. Hofer, P. Artal, B. Singer, J. L. Aragon, and D. R. Williams, “Dynamics of the eye's wave aberration,” J. Opt. Soc. Am. A 18, 497–506 (2001). [CrossRef]

, 27

27. L. Diaz-Santana, C. Torti, I. Munro, P. Gasson, and C. Dainty, “Benefit of higher closed-loop bandwidths in ocular adaptive optics,” Opt. Express 11, 2597–2605 (2003). [CrossRef] [PubMed]

].

2B. Wavefront Corrector Models

Figure 2 depicts the three types of wavefront correctors evaluated in this paper. The correctors are listed below, using a nomenclature similar to that by Hardy [24

24. J. W. Hardy, Adaptive Optics for Astronomical Telescopes (Oxford U. Press, 1998).

] and Tyson [25

25. R. K. Tyson, Principles of Adaptive Optics, 2nd ed. (Academic, 1998).

].
  • Discrete actuator deformable mirrors have a continuous reflective surface whose profile is controlled by an underlying array of actuators (Fig. 2, top). Pushing one actuator produces a localized deflection of the mirror surface, termed the influence function. The deflection typically extends to adjacent actuators where it changes the mirror surface height by a fraction of the peak deflection. This fraction is termed the coupling coefficient.
  • Piston-only, segmented correctors consist of an array of adjacent, planar mirror segments that are independently controlled (Fig. 2, middle). They have 1 degree of freedom that corresponds to pure, vertical piston. The influence function is a top hat with a zero coupling coefficient. The piston effect can also be realized with LC-SLMs that induce local optical path-length changes by altering the refractive index rather than translating mirror segments.
  • Piston∕tip∕tilt, segmented correctors represent an embellishment of the piston-only, segmented corrector in which 2 additional degrees of freedom (tip and tilt) are added for slope control. This results in improved wavefront fitting and reduced number of segments needed to achieve the same level of correction (Fig. 2, bottom).
Each of the wavefront correctors was modeled as a square grid of equally spaced and independently controlled actuators or segments, with essentially infinite resolution. While in practice, the resolution is limited by the bit depth of the control electronics (typically 8–14 bits), our modeling revealed little performance advantage with unlimited resolution. The dynamic range (stroke) of the actuators was not constrained, assuring the range was always larger than the PV errors in the two populations.

The surface shape for all three wavefront correctors, ϕcor(x,y), can be predicted principally from the maximum surface deflection of each actuator, An, the influence function of each actuator gn(x,y), and their interdependency. A common approach, chosen here due to the large number of corrector variations evaluated, is to assume identical and independent influence functions [46

46. R. H. Hudgin, “Wave-front compensation error due to finite element corrector size,” J. Opt. Soc. Am. 67, 393–395 (1977). [CrossRef]

, 47

47. M. C. Roggemann and B. Welsh, Imaging Through Turbulence (CRC, 1996).

]. This results in linearity of the actuator responses and permits modeling the corrector surface with the following relationship:
ϕcor(x,y)=n=1NAngn(xxn,yyn),
(1)
where N is the total number of actuators, x and y are spatial coordinates at the corrector, and xn and yn define the center location of the nth actuator. While our neglect of the interdependency of the actuators precludes capturing some performance aspects of real correctors, it provides reasonable performance estimates for correctors that one might consider for a vision AO system. The influence function, gn(x,y), uniquely distinguishes the three correctors, Eq. (1).

For discrete actuator DMs, the influence function can be approximated as a Gaussian, i.e.,
gn(x,y)=exp((xxn)22σ2)exp((yyn)22σ2),
(2)
where σ defines the spatial extent of the influence function. In our model, σ was set to give a coupling coefficient of 12%, an approximate value for many discrete actuator DMs [23

23. B. R Oppenheimer, D. L. Palmer, R. G. Dekany, A. Sivaramakrishnan, M. A. Ealey, and T. R. Price, “Investigating a Xinetics Inc. deformable mirror,” Proc. SPIE 3126, 569–579 (1997). [CrossRef]

, 37

37. J. A. Perreault, T. G. Bifano, B. M. Levine, and M. N. Horenstein, “Adaptive optic correction using microelectromechanical deformable mirrors,” Opt. Eng. 41, 561–566 (2002). [CrossRef]

]. The linear relationship of Eq. (1) predicts a slightly rippled surface when all of the actuators are displaced by the same amount. This pinning error [25

25. R. K. Tyson, Principles of Adaptive Optics, 2nd ed. (Academic, 1998).

], does not occur in actual DMs that have stiff faceplates and does give an underestimate of actual device performance.

The influence function for piston-only segmented correctors was modeled as a top hat having a constant value across each individual segment (which is controlled by a single actuator) and zero across all other segments. The gaps between the square segments were assumed to be zero (100% fill factor). The mirror performance with other fill factors can be found in Miller et al. [42

42. D. T. Miller, L. N. Thibos, and X. Hong, “Requirements for segmented correctors for diffraction-limited performance in the human eye,” Opt. Express 13, 275–289 (2005). [CrossRef] [PubMed]

].

Piston∕tip∕tilt, segmented correctors were modeled with 3 degrees of freedom per segment, with each having its own independent influence function. The gaps between the square segments were again assumed to be zero. In practice, fill factors of 96%–99% can be routinely achieved [48

48. N. Doble, M. Helmbrecht, M. Hart, and T. Juneau, “Advanced wave-front correction technology for the next generation of adaptive optics equipped ophthalmic instrumentation,” Proc. SPIE 5688, 125–132 (2006). [CrossRef]

].

Performance for the three corrector types was determined using the following procedure:

  1.  (1) An influence function matrix, Icor, is generated for a specific corrector type and number of actuators, N, as given by Eq. (3). Edge effects of the circular pupil were accounted for in the individual influence functions. Icor represents a P by N matrix in which each column corresponds to the influence function, gn(x,y), of a single actuator. P is the total number of sampling points across the influence function profile in the circular aperture. For piston∕tip∕tilt, segmented correctors, each column in Eq. (3) contains three influence functions that describe one segment:
    Icor=[I(1,1)I(1,2)I(1,N)I(2,1)I(2,2)I(2,N)I(P,1)I(P,2)I(P,N)].
    (3)
  2.  (2) A wavefront aberration map, ϕeye, is reconstructed using the measured Zernike coefficients from the Shack–Hartmann aberrometry for a specific pupil size and eye in the two populations.
  3.  (3) Singular value decomposition is used to invert the influence function matrix (step 1) Icor. Icor and the wavefront aberrations of the eye (step 2) are inserted into Eq. (4). The actuator deflections, An, are then determined by solving
    An=Icorϕeye,
    (4)
    where An and ϕeye are column matrices described by
    An=[A1A2AN]ϕeye=[ϕ1ϕ2ϕP].
    (5)
    This approach produces values for An that minimize the rms residual wavefront error
  4.  (4) The corrector surface, ϕcor, is reconstructed from the actuator deflections, An, and then subtracted from the wavefront aberration of the eye, ϕeye. The resulting residual aberration is ϕresidual.
  5.  (5) The complex field, ψ, at the pupil is represented as |ψ|exp(ikϕresidual) with the amplitude of the wavefront, |ψ|, defined as unity inside and zero outside of the circular pupil. k is equal to 2π/λ with λ being the wavelength of light. Fourier transforming ψ and taking its squared modulus yields the corrected point-spread function (PSF). Thus the PSF includes the impact of residual aberrations and scalar diffraction effects generated by the finite size of the pupil. The Strehl ratio was used as the figure of merit and is defined as the ratio of the light intensity at the peak of the aberrated PSF to that at the peak of the aberration-free PSF. Generally, an optical system is considered diffraction limited if the Strehl is 0.8.
  6.  Other common figures of merit include root-mean-square (rms) wavefront error and full width at half-height (FWHH) of the PSF. For reasonably well-corrected systems, however, the rms and FWHH generally provide little additional information about image quality beyond that revealed by Strehl. This is because for such systems, Strehl and rms are highly correlated [49

    49. W. B. King, “Dependence of the Strehl ratio on the magnitude of the variance of the wave aberration,” J. Opt. Soc. Am. 58, 655–661 (1967). [CrossRef]

    ], while the FWHH of the PSF is largely insensitive to small changes in the wave aberrations, which Strehl is not. As such, Strehl is a reliable guide for establishing corrector requirements for diffraction-limited imaging in the human eye and is therefore used here.
  7.  (6) Steps 1 through 5 are repeated for each corrector type, actuator number, pupil diameter (4.5, 6,7.5mm), wavelength (0.4, 0.6, 0.8, and 1.0μm), and for each eye in the two populations.

This procedure is illustrated in Fig. 3 for the compensation of aberrations across a 7.5mm pupil using a discrete actuator DM, piston-only segmented corrector, and piston∕tip∕tilt segmented corrector. Each corrector has seven actuators or segments across the pupil diameter. Figure 3(a) is the measured uncorrected wave aberration for a single subject from the Rochester population with defocus zeroed. Figures 3(b), 3(e), and 3(h) show the respective conjugate mirror surface that minimizes the rms wavefront error for each of the mirror types. Figures 3(c), 3(f), and 3(i) show the residual error after correction of the wave aberrations in Fig. 3(a). The corresponding corrected point spread functions and Strehl ratios are given in Figures 3(d), 3(g), and 3(j) for a wavelength, λ=0.6μm. It should be noted that the segmented piston∕tip∕tilt device has three actuators per segment compared with just one for the other two devices.

3. Results

3A. Required Corrector Stroke for the Two Populations

Regardless of corrector type and number of actuators, effective compensation requires the dynamic range of the corrector to be at least equal to the peak-to-valley (PV) error of the aberrations (assuming no phase wrapping). For reflective correctors, this means the maximum physical excursion of their reflective surface must be at least one-half of the PV error.

Figure 4 shows the PV wavefront error that encompasses 25%, 50%, and 95% of the two populations for 4.57.5mm pupils. In each plot, three curves are shown for each population and correspond to the three different second-order states. As expected, the PV error increases monotonically with increasing pupil size. Note the second-order aberrations in the Rochester population include the subject's entire refractive error, while the Indiana data include only the residual error after a subjective refraction. This inherent difference makes a direct comparison of the two datasets difficult as higher-order aberrations influence the patient's best subjective refraction and lead to nonzero residual defocus and astigmatism. Zeroing Zernike coefficients (as was done for four of the six curves in each of the Fig. 4 plots) is, therefore, not directly equivalent to an ideal conventional refraction and can lead to higher PV errors.

In Fig. 4, the PV error noticeably increases with the addition of the second-order terms and is consistently larger for the Rochester population for all three-second-order states. The PV error for a 7.5mm pupil that encompassed 95% of the Rochester population was 53, 18, and 10μm for the three second-order conditions. For the Indiana population, the corresponding 95% errors were 11, 10, and 7μm. The largest errors of 53μm (Rochester) and 11μm (Indiana) depict the most demanding conditions for the corrector. For comparison, Xinetics type DMs employed in some vision science cameras [1

1. J. Liang, D. R. Williams, and D. T. Miller, “Supernormal vision and high-resolution retinal imaging through adaptive optics,” J. Opt. Soc. Am. A 14, 2884–2892 (1997). [CrossRef]

, 2

2. H. Hofer, L. Chen, G. Y. Yoon, B. Singer, Y. Yamauchi, and D. R. Williams, “Improvement in retinal image quality with dynamic correction of the eye's aberrations,” Opt. Express 8, 631–643 (2001). [CrossRef] [PubMed]

, 6

6. J. Rha, R. S. Jonnal, K. E. Thorn, J. Qu, Y. Zhang, and D. T. Miller, “Adaptive optics flood-illumination camera for high speed retinal imaging,” Opt. Express 14, 4552–4569 (2006). [CrossRef] [PubMed]

, 7

7. S. S. Choi, N. Doble, J. L. Hardy, S. M. Jones, J. L. Keltner, S. S. Olivier, and J. S. Werner, “In vivo imaging of the photoreceptor mosaic in retinal dystrophies and correlations with retinal function,” Invest. Ophthalmol. Visual Sci. 47, 2080–2092 (2006). [CrossRef]

, 9

9. A. Roorda, F. Romero-Borja, W. J. Donnelly, H. Queener, T. J. Hebert, and M. C. W. Campbell, “Adaptive optics scanning laser ophthalmoscopy,” Opt. Express 10, 405–412 (2002). [PubMed]

, 11

11. D. T. Miller, J. Qu, R. S. Jonnal, and K. Thorn, “Coherence gating and adaptive optics in the eye,” Proc. SPIE 4956, 65–72 (2003). [CrossRef]

] have a stroke of only 4μm (8μm in wavefront after reflection), which approaches the 11μm (Indiana data) required to correct for the patient's residual defocus and astigmatism and higher-order aberrations but falls considerably short of the 53μm (Rochester data) needed to correct for all of the patient's defocus, astigmatism, and higher-order aberrations.

3B. Required Actuator Number for Discrete Actuator Deformable Mirrors

Figure 5 (top) shows the predicted mean corrected Strehl for discrete actuator DMs as a function of the number of actuators (7.5mm pupil, λ=0.6μm). The six curves cover the two populations and the three different levels of second-order aberration defined previously. One curve includes representative error bars that correspond to ±1 standard deviation across the population. All curves exhibit a similar shape that is monotonic and positively sloped. With zero actuators, the corrected Strehl reflects the image quality of the eye without wavefront correction. For five to nine actuators across the pupil, the Strehl ratio for five of the six curves rises sharply, indicating a significant improvement in image quality, small changes in the number of actuators leading to noticeable changes in corrected image quality. This increase is due to the effective correction of the lower-order aberrations, which contain the largest percentage of the wave aberration variance [44

44. L. N. Thibos, X. Hong, A. Bradley, and X. Cheng, “Statistical variation of aberration structure and image quality in a normal population of healthy eyes,” J. Opt. Soc. Am. A 19, 2329–2348 (2002). [CrossRef]

, 50

50. J. Porter, A. Guirao, I. G. Cox, and D. R. Williams, “Monochromatic aberrations of the human eye in a large population,” J. Opt. Soc. Am. A 18, 1793–1803 (2001). [CrossRef]

]. The error bars are relatively large over this range, reflecting the large variability in corrector performance between the worst and best eyes. For more than nine actuators across the pupil, the Strehl ratio rises gradually to an asymptotic value of 1. The diminishing improvement in corrected image quality makes larger and more expensive correctors increasingly less attractive.

For the Indiana population, 11–14 actuators across the 7.5mm pupil diameter are required to achieve a Strehl ratio 0.8. The actual number depends on the magnitude of the second-order terms in the wave aberration. For the Rochester population, with a larger average aberration magnitude, 14 to 15 actuators across the pupil were required for the two cases where second-order defocus and astigmatism (Z3–Z5) and second-order defocus (Z4) were zeroed prior to correction. The most aberrated scenario, which included all second-order terms, clearly required many more actuators than the largest considered here (21 across the pupil), which only increased the Strehl to 0.18.

Figure 5 (middle) and (bottom) show the predicted mean corrected Strehl for smaller pupils of 6 and 4.5mm, respectively. In the Rochester population, decreasing the pupil size to 6 mm reduces the number of actuators across the pupil for diffraction-limited imaging to approximately 9. For the Indiana population, the corresponding actuator numbers are 7 and 8. For the 4.5mm pupil, the numbers are 6 to 7 and 4 to 5 for the Rochester and Indiana populations, respectively.

3C. Required Actuator Number for Piston-Only, Segmented Correctors

Figure 7 shows the predicted corrected Strehl for piston-only, segmented correctors as a function of the number of actuators (λ=0.6μm) for 7.5 (top), 6 (middle), and 4.5mm (bottom) pupils. Each contains six curves that cover the two populations and the three levels of second-order aberration. One of the six includes representative error bars of ±1 standard deviation across the population. While the general trend of the curves is similar to that for the discrete actuator DMs, the number of required segments is much higher to achieve the same imaging performance.

For example, in the Indiana population (7.5mm pupil), 50–90 segments across the pupil diameter are required to achieve a Strehl ratio 0.8, with the actual number being highly sensitive to the magnitude of the second-order aberrations. A 90 × 90 piston-only, segmented corrector gives the same corrected Strehl (0.8) as a discrete actuator DM with 14×14 actuators. For the Rochester population, 95–115 segments are required to reach a Strehl ratio of 0.8 if defocus and astigmatism (Z3–Z5) or defocus alone (Z4) were zeroed prior to correction. Even the largest segmented mirror considered in our study (150×150 actuators) performed poorly when attempting to correct all of the second- and higher-order aberrations, just reaching a Strehl of 0.2.

For the smaller pupil diameters, the required number of actuators decreases accordingly. For 6 mm, the required number of segments to achieve diffraction-limited imaging are 40–55 and 25–40 segments for the Rochester and Indiana populations, respectively. For 4.5mm, the values are 10–15 segments and 15–25 segments, respectively. The values for the Rochester population do not include the case where all aberrations are present.

3D. Required Actuator Number for Piston∕Tip∕Tilt, Segmented Correctors

Like the other wavefront correctors, for smaller pupil diameters, the required number of actuators decreases accordingly. For 6mm, the required number of segments to achieve diffraction-limited imaging are 8–13 and approximately 6 segments for the Rochester and Indiana populations, respectively. For 4.5mm, the values are 5 to 9 and 3 to 4 segments, respectively. The values for the Rochester population do not include the case where all aberrations are present.

The addition of tip and tilt control clearly improves the wavefront fitting, especially at the edges of the pupil where the slopes can be great. This comes at the expense of additional complexity in mirror control in that three movement controls are required for each segment rather than one.

4. Discussion

The performance of three general wavefront corrector types was systematically evaluated as a function of pupil size, second-order aberration state, imaging wavelength, and actuator number. Actuator influence function was representative of that typical for each of the corrector types. In this way, the analysis retained its generality, making it applicable to a wide variety of available commercial wavefront correctors as well as new ones in the future. To simplify the analysis, the actuator response was assumed to be linear. Actuator stroke and number required for achieving a specific performance level were independently determined by basing the first solely on the PV errors of the two populations and the second assuming a stroke larger than the PV error. While this approach does not cover device configurations in which actuator stroke and number simultaneously limit performance, it does establish lower bounds on the requirements for the two actuator parameters.

4A. Required Actuator Stroke

Regardless of corrector type, effective compensation requires the dynamic range of the corrector to be at least equal to the PV error of the aberrations. For reflective correctors, this means the maximum physical excursion of their reflective surface must be at least one-half of the PV error. For segmented correctors (either reflective or transmissive), the stroke can be effectively increased with phase wrapping, though limitations apply [38

38. L. N. Thibos and A. Bradley, “Use of liquid-crystal adaptive-optics to alter the refractive state of the eye,” Optom. Vision Sci. 74, 581–587 (1997). [CrossRef]

, 42

42. D. T. Miller, L. N. Thibos, and X. Hong, “Requirements for segmented correctors for diffraction-limited performance in the human eye,” Opt. Express 13, 275–289 (2005). [CrossRef] [PubMed]

].

Most commercial wavefront correctors have insufficient stroke to traverse the PV errors shown in Fig. 4 for large pupils. However, there are several strategies for reducing the error to a more manageable level. For retinal imaging applications, a possible strategy is to minimize PV errors by meticulously employing trial lenses in conjunction with continuously adjustable lenses to optimize retinal image quality and to avoid quantization errors of the trial lenses [1

1. J. Liang, D. R. Williams, and D. T. Miller, “Supernormal vision and high-resolution retinal imaging through adaptive optics,” J. Opt. Soc. Am. A 14, 2884–2892 (1997). [CrossRef]

]. Another approach is to cascade a large stroke, low fidelity corrector (e.g., bimorph DM) to correct the relatively large second-order aberrations and a smaller stroke, high fidelity corrector (e.g., a MEMS DM) to compensate for higher-order aberrations [51

51. R. J. Zawadzki, S. S. Choi, J. S. Werner, S. M. Jones, D. Chen, S. S. Olivier, Y. Zhang, J. Rha, B. Cense, and D. T. Miller, “Two deformable mirror adaptive optics system for in vivo retinal imaging with optical coherence tomography,” presented at the 2006 Biomedical Optics Topical Meeting, Fort Lauderdale, Fla., USA, 22 March 2006.

]. Double pass schemes have also been proposed [52

52. R. H. Webb, M. J. Albanese, Y. Zhou, T. Bifano, and S. A. Burns, “Stroke amplifier for deformable mirrors,” Appl. Opt. 43, 5330–5333 (2004). [CrossRef] [PubMed]

]. Finally, some retinal imaging and vision applications have less demanding resolution requirements and therefore can operate with smaller pupils. For example, reducing the 7.5mm pupil size to 6 and 4.5mm in the Rochester population reduces the PV error to 30, 10, and 5μm and 17, 7, and 3μm, respectively for the three second-order states. For the Indiana population, the corresponding PV error reduces to 6, 5, and 4μm and 2.5, 2, and 1.5μm.

4B. Required Actuator Number

4B1. Discrete Actuator Deformable Mirror

Discrete actuator DMs were modeled using a linear superposition of Gaussian influence functions. While easy to conceptualize, the assumption of linearity likely underestimates the fitting performance, an error that increases with the aberrations. Hence, the model probably underestimated the corrector performance somewhat more for the Rochester population than for the Indiana population, especially for the highly aberrated case in which there was no defocus and astigmatism correction (Fig. 5). This effect can be eliminated by use of a more accurate model, for example, finite-element analysis (FEA) [53

53. O. C. Zienkiewicz, The Finite Element Method in Engineering Science, 2nd ed. (McGraw-Hill, 1971).

], that incorporates the material properties of the corrector such as thickness, modulus of elasticity, and Poisson's ratio that determine the influence functions and ultimately mirror shape [54

54. J. H. Lee, T.-K. Uhm, and S.-K. Youn, “First-order analysis of thin-plate deformable mirrors,” J. Korean Phys. Soc. 44, 1412–1416 (2004).

, 55

55. L. Arnold, “Influence functions of a thin shallow meniscus-shaped mirror,” Appl. Opt. 36, 2019–2028 (1997). [CrossRef] [PubMed]

, 56

56. A. Menikoff, “Actuator influence functions of active mirrors,” Appl. Opt. 30, 833–838 (1991). [CrossRef] [PubMed]

]. Such analysis, however, must be customized for a particular wavefront corrector, an approach not readily applicable for the many corrector configurations evaluated here. A more plausible use of FEA would be to fine-tune the performance of specific correctors that were found to perform well with the linear model.

Performance predictions with our linear model roughly agree with experimental results reported in the literature. For example, Xinetics DMs totaling 37 (7 across) [1

1. J. Liang, D. R. Williams, and D. T. Miller, “Supernormal vision and high-resolution retinal imaging through adaptive optics,” J. Opt. Soc. Am. A 14, 2884–2892 (1997). [CrossRef]

, 2

2. H. Hofer, L. Chen, G. Y. Yoon, B. Singer, Y. Yamauchi, and D. R. Williams, “Improvement in retinal image quality with dynamic correction of the eye's aberrations,” Opt. Express 8, 631–643 (2001). [CrossRef] [PubMed]

, 6

6. J. Rha, R. S. Jonnal, K. E. Thorn, J. Qu, Y. Zhang, and D. T. Miller, “Adaptive optics flood-illumination camera for high speed retinal imaging,” Opt. Express 14, 4552–4569 (2006). [CrossRef] [PubMed]

, 9

9. A. Roorda, F. Romero-Borja, W. J. Donnelly, H. Queener, T. J. Hebert, and M. C. W. Campbell, “Adaptive optics scanning laser ophthalmoscopy,” Opt. Express 10, 405–412 (2002). [PubMed]

, 11

11. D. T. Miller, J. Qu, R. S. Jonnal, and K. Thorn, “Coherence gating and adaptive optics in the eye,” Proc. SPIE 4956, 65–72 (2003). [CrossRef]

, 13

13. Y. Zhang, J. Rha, R. S. Jonnal, and D. T. Miller, “Adaptive optics parallel spectral domain optical coherence tomography for imaging the living retina,” Opt. Express 13, 4792–4811 (2005). [CrossRef] [PubMed]

] and 97 actuators (11 across) [57

57. N. M. Putnam, H. J. Hofer, N. Doble, L. Chen, J. Carroll, and D. R. Williams, “The locus of fixation and the foveal cone mosaic,” J. Vision 5, 632–639 (2005). [CrossRef]

] actuators have been employed in several AO systems for vision science. Using Fig. 5 (middle), the 37 actuator Xinetics is predicted to increase the Strehl from 0.03 to 0.5 for the Rochester population with zeroed defocus for a 6mm pupil. In comparison, Hofer et al. [2

2. H. Hofer, L. Chen, G. Y. Yoon, B. Singer, Y. Yamauchi, and D. R. Williams, “Improvement in retinal image quality with dynamic correction of the eye's aberrations,” Opt. Express 8, 631–643 (2001). [CrossRef] [PubMed]

] used the same corrector to achieve a dynamically corrected Strehl ratio of 0.34±0.12 for a 6mm pupil at 0.55μm wavelength after a trial lens refraction (average of six subjects). While the 0.34 Strehl is lower than the predicted 0.5, this discrepancy might be explained by a number of differences. First, there is a wavelength difference, 0.55μm instead of 0.6μm. Second, the experimental correction was applied over a 6.8mm pupil with the central 6mm (the model used 6 mm) providing the wavefront measurement. Both differences will cause a reduction in the experimental Strehl. Roorda et al. [9

9. A. Roorda, F. Romero-Borja, W. J. Donnelly, H. Queener, T. J. Hebert, and M. C. W. Campbell, “Adaptive optics scanning laser ophthalmoscopy,” Opt. Express 10, 405–412 (2002). [PubMed]

] report corrected rms values as low as 0.09μm for a 7mm pupil, giving predicted Strehls of up to 0.34. Similarly, Rha et al. [6

6. J. Rha, R. S. Jonnal, K. E. Thorn, J. Qu, Y. Zhang, and D. T. Miller, “Adaptive optics flood-illumination camera for high speed retinal imaging,” Opt. Express 14, 4552–4569 (2006). [CrossRef] [PubMed]

] give corrected rms values of 0.07μm for a 6.8mm pupil, giving Strehls of 0.52. Both systems employ a 37 channel Xinetics DM.

4B2. Segmented Piston-Only, and Piston∕Tip∕Tilt Correctors

Segmented piston-only correctors rely on local piston correction to remove aberrations and therefore require a minimum of two segments to correct for wavefront slope. It is not surprising then that these correctors require many more actuators than the discrete actuator DMs described previously. The study reported by Miller et al. [42

42. D. T. Miller, L. N. Thibos, and X. Hong, “Requirements for segmented correctors for diffraction-limited performance in the human eye,” Opt. Express 13, 275–289 (2005). [CrossRef] [PubMed]

] found that 48 piston-only segments were required for diffraction-limited imaging across a 6 mm pupil in 0.6μm light. For this scenario, residual defocus and astigmatism (Z3–Z5) was present after a conventional refraction. The requirement was reduced to 20 segments when the second-order terms were completely removed prior to correction. Our results with the Indiana population agree well with this study, finding that for a 6 mm pupil, the required number of segments to achieve diffraction-limited imaging is 25–40 segments. For the Rochester population, which unlike the other studies did not include a subjective refractive, the required number of segments was higher (40–55).

The 2 extra degrees of freedom of the segmented piston∕tip∕tilt mirrors provide wavefront slope correction and therefore drastically reduce the required number of segments. The added degrees of freedom, however, add complexity and may be one of the reasons why few such correctors have been made, and none have yet to be applied to the human eye.

Segmented piston-only and piston∕tip∕tilt correctors were modeled having 100% fill (no gaps). In reality, fill coverage of 96%–99% is typical [48

48. N. Doble, M. Helmbrecht, M. Hart, and T. Juneau, “Advanced wave-front correction technology for the next generation of adaptive optics equipped ophthalmic instrumentation,” Proc. SPIE 5688, 125–132 (2006). [CrossRef]

] and can diffract incident light away from the core of the point spread. For these fills, however, the effect should be small if they follow the trend reported by Miller et al. [42

42. D. T. Miller, L. N. Thibos, and X. Hong, “Requirements for segmented correctors for diffraction-limited performance in the human eye,” Opt. Express 13, 275–289 (2005). [CrossRef] [PubMed]

], who quantified the drop in Strehl for fills of 73.5% and 86%. For example, Miller et al. [42

42. D. T. Miller, L. N. Thibos, and X. Hong, “Requirements for segmented correctors for diffraction-limited performance in the human eye,” Opt. Express 13, 275–289 (2005). [CrossRef] [PubMed]

] showed for a particular configuration that the mean Strehl dropped by 0.22 (from 0.9 to 0.68) and 0.4 (from 0.9 to 0.5) when the fill coverage decreased from 100% to 86% and 73.5%, respectively. For the segmented piston∕tip∕tilt correctors, edge effects at the gaps due to tilting of the segments were assumed negligible.

4B3. Phase Wrapping

A unique advantage of segmented correctors, in principle, is their ability to correct large PV errors using a limited stroke of just 2π rad. The segmented nature permits abrupt changes in the phase profile required to phase wrap to modulo 2π. Most LC-SLMs are purposely designed for 2π phase correction and rely on phase wrapping to extend their dynamic range [38

38. L. N. Thibos and A. Bradley, “Use of liquid-crystal adaptive-optics to alter the refractive state of the eye,” Optom. Vision Sci. 74, 581–587 (1997). [CrossRef]

, 42

42. D. T. Miller, L. N. Thibos, and X. Hong, “Requirements for segmented correctors for diffraction-limited performance in the human eye,” Opt. Express 13, 275–289 (2005). [CrossRef] [PubMed]

]. A fundamental weakness is the system can only correct at a single wavelength and its associated harmonics. The results in Figs. 7 and 8 represent both unwrapped and wrapped devices, but correct interpretation of the latter is contingent on perfect 2π wrapping at the one wavelength.

The effects of phase wrapping for correcting the aberrations of the eye in polychromatic light have been explored by Miller et al. [42

42. D. T. Miller, L. N. Thibos, and X. Hong, “Requirements for segmented correctors for diffraction-limited performance in the human eye,” Opt. Express 13, 275–289 (2005). [CrossRef] [PubMed]

]. Their model included the impact of the dispersion of the liquid crystal material (E-7) and the longitudinal chromatic aberrations of the normal eye. The impact of the eye's intrinsic longitudinal chromatic aberrations was shown to be significantly more degrading than either phase wrapping or material dispersion.

4C. Dynamic Versus Static Correction

Studies have shown that temporal fluctuations in the wave aberrations of the eye range from 1 to 12Hz, with most of the energy confined below 1Hz [26

26. H. Hofer, P. Artal, B. Singer, J. L. Aragon, and D. R. Williams, “Dynamics of the eye's wave aberration,” J. Opt. Soc. Am. A 18, 497–506 (2001). [CrossRef]

, 27

27. L. Diaz-Santana, C. Torti, I. Munro, P. Gasson, and C. Dainty, “Benefit of higher closed-loop bandwidths in ocular adaptive optics,” Opt. Express 11, 2597–2605 (2003). [CrossRef] [PubMed]

]. Contributing to this are the microfluctuations in accommodation that can typically vary the defocus coefficient by 0.1μm [26

26. H. Hofer, P. Artal, B. Singer, J. L. Aragon, and D. R. Williams, “Dynamics of the eye's wave aberration,” J. Opt. Soc. Am. A 18, 497–506 (2001). [CrossRef]

]. Ocular temporal fluctuations are well within the bandwidth of essentially all wavefront correctors, with the exception of those based on liquid crystals. As such, a static treatment of the aberrations, as was chosen for our analysis, is sufficient for capturing the performance of most wavefront correctors. A particular advantage of segmented correctors, however, is given zero or negligible hysteresis and interactuator coupling; they allow open loop operation, i.e., no feedback control.

4D. Required Parameters

Table 1 summarizes the results for the three wavefront corrector types analyzed for actuator stroke and number for a 7.5mm pupil. Also listed are corrector specifications for temporal bandwidth, reflectivity, and corrector size, which are also important for retinal imaging and vision application. High mirror reflectivity (>90%) assures high throughput efficiency of the corrector, particularly critical for retinal imaging applications in which a hard upper limit exists for the amount of light that can be safely directed into the human eye. A corrector size comparable with a dilated pupil (78mm) permits the use of short focal length lenses and mirrors, and facilitates compact system designs. The required corrector stroke was observed to vary with the population as well as the second-order aberration condition, with values ranging from 10 to 53μm (Rochester data) and 7 to 11μm (Indiana data). The required number of mirror actuators also varied depending on the population, the second-order aberration condition, and mirror type.

5. Conclusion

The extent to which AO can effectively improve resolution and contrast fundamentally depends on its ability to accurately measure, track, and correct ocular aberrations. As surveyed, numerous types of wavefront correctors have been applied to the eye, yet none have reported diffraction-limited imaging for large pupils (6mm). This raises a fundamental concern as to the required characteristics of a correcting device to achieve diffraction-limited imaging and to optimally match corrector performance and cost to that required of a particular imaging task in the eye.

Our analysis represents a first attempt at exploring the most critical parameters for three general types of correctors. A more detailed assessment that accounts for variations in the actuator influence functions, the magnitude of the actuator coupling coefficient, and the interdependency and distribution of the actuators will lead to improved quantitative predictions of corrector performance, especially when implemented in the context of finite-element analysis.

In conclusion, correction of the wave aberration of the eye remains challenging, especially for diffraction-limited imaging through large pupils. Understanding the performance parameters that enable such imaging in the population at large will guide new, compact correctors and lead to more effective research and commercial instruments for retinal imaging and vision testing.

The authors thank Ian Cox of Bausch & Lomb and Larry Thibos at Indiana University for providing the subject data for the two populations. Nathan Doble gratefully acknowledges Stacey Choi for helpful discussions and input. Donald Miller thanks Huawei Zhao for early help on the wavefront corrector models. This work has been supported in part by the National Science Foundation Science and Technology Center for Adaptive Optics (CfAO), managed by the University of California at Santa Cruz under cooperative agreement. AST-9876783. Financial support was also provided by the National Eye Institute Grant 5R01 EY014743 to Donald T. Miller. Geunyoung Yoon acknowledges financial support from National Eye Institute grant EY014999 and Research for Preventing Blindness.

Table 1. Predicted Wavefront Corrector Parameters for Diffraction-Limited Imaging in the Eye

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Fig. 1 Log10 of the wavefront variance plotted as a function of Zernike order for the two populations (7.5mm pupil). Diamonds and corresponding dashed curves represent the mean and mean ±2 times the standard deviation of the log10 (wavefront variance), respectively, for the 70 eyes measured in the Rochester (black) and Indiana (gray) studies.
Fig. 2 Schematic cross sections of the three types of wavefront correctors evaluated. For illustration, the reflective surface of each corrector is configured for compensating the same wavefront aberration. See text for description of the corrector types.
Fig. 3 Compensation of aberrations across a 7.5mm pupil using a discrete actuator DM, piston-only, and piston∕tip∕tilt segmented correctors. Each of the mirrors has seven actuators or segments across the pupil diameter. Wavefront phase is represented by a gray-scale image (black and white tones depict minimum and maximum phase, respectively). (a) Measured uncorrected wave aberration for one subject's eye from the Rochester population with defocus zeroed. (b) Conjugate mirror surface that minimizes the rms wavefront error for the subject's wave aberrations in (a) for the discrete actuator device. (c) Residual aberrations after correction of the wave aberrations in (a) with the corrector phase profile in (b). The phase rms and PV are specified at the bottom of each image. The corresponding corrected point spread function and Strehl ratio is given in (d), with the former computed using scalar diffraction theory that incorporated the residual wave aberration and a circular pupil (λ=0.6μm). (e)–(g) Mirror phase profile, residual aberrations, and the corrected point spread for the piston-only case, respectively. (h)–(j) Analogous figures for the segmented piston∕tip∕tilt mirror. Note: The segmented piston∕tip∕tilt device does have three actuators per segment.
Fig. 4 PV wavefront error that encompasses 25% (top), 50% (middle), and 95% (bottom) of the population in the Rochester (black curves) and Indiana (gray curves) populations as a function of pupil diameter. For the Rochester data, three cases are presented: (i) all aberrations present (short dashed curves), (ii) all aberrations present with zeroed Zernike defocus (long dashed curves), and (iii) all aberrations present with zeroed defocus and astigmatism (solid curves). For the Indiana data, the three cases are (i) residual aberrations after a conventional refraction using trial lenses (short dashed curves), (ii) all aberrations present with zeroed Zernike defocus (long dashed curves), and (iii) all aberrations present with zeroed defocus and astigmatism (solid curves).
Fig. 5 Corrected Strehl ratio for discrete actuator DMs as a function of actuator number for pupil diameters of 7.5 (top), 6 (middle), and 4.5mm (bottom). The wavelength is 0.6μm. For each plot, three curves are shown for the Rochester (black) and Indiana (gray) populations, and correspond to the presence of all aberrations (short dashed curve), all aberrations with zeroed Zernike defocus (long dashed curves), and all aberrations with zeroed second-order aberrations (solid curves). Note that the all aberrations condition for the Rochester population includes the subject's refractive error, while that for the Indiana population includes only the residual defocus and astigmatism after a spherocylindrical correction with trial lenses. The error bars for the single representative curve correspond to ±1 standard deviation.
Fig. 6 Corrected Strehl for different wavelengths (0.4, 0.6, 0.8, and 1μm) and number of actuators across the 7.5mm pupil for the Indiana population. Residual defocus was zeroed.
Fig. 7 Corrected Strehl ratio for piston-only, segmented correctors as a function of segment number for pupil diameters of 7.5 (top), 6 (middle), and 4.5 mm (bottom). The wavelength is 0.6μm. For each plot, three curves are shown for the Rochester (black) and Indiana (gray) populations and correspond to the presence of all aberrations (short dashed curve), all aberrations with zeroed Zernike defocus (long dashed curves), and all aberrations with zeroed second-order aberrations (solid curves). Note: For the 6mm pupil diameter, the results for the Indiana population with all aberrations present follows very closely the predicted performance for the Rochester case with zeroed second-order aberrations. The error bars for the single representative curve correspond to ±1 standard deviation.
Fig. 8 Corrected Strehl ratio for piston∕tip∕tilt segmented correctors as a function of segment number for pupil diameters of 7.5 (top), 6 (middle), and 4.5mm (bottom). The wavelength is 0.6μm. For each plot, three curves are shown for the Rochester (black) and Indiana (gray) populations and correspond to the presence of all aberrations (short dashed curve), all aberrations with zeroed Zernike defocus (long dashed curves), and all aberrations with zeroed second-order aberrations (solid curves). The error bars for the single representative curve correspond to ±1 standard deviation.
1.

J. Liang, D. R. Williams, and D. T. Miller, “Supernormal vision and high-resolution retinal imaging through adaptive optics,” J. Opt. Soc. Am. A 14, 2884–2892 (1997). [CrossRef]

2.

H. Hofer, L. Chen, G. Y. Yoon, B. Singer, Y. Yamauchi, and D. R. Williams, “Improvement in retinal image quality with dynamic correction of the eye's aberrations,” Opt. Express 8, 631–643 (2001). [CrossRef] [PubMed]

3.

V. Larichev, P. V. Ivanov, N. G. Iroshnikov, V. I. Shmalhauzen, and L. J. Otten, “Adaptive system for eye-fundus imaging,” Quantum Electron. 32, 902–908 (2002). [CrossRef]

4.

N. Ling, Y. Zhang, X. Rao, X. Li, C. Wang, Y. Hu, and W. Jiang, “Small table-top adaptive optical systems for human retinal imaging,” Proc. SPIE 4825, 99–108 (2002). [CrossRef]

5.

M. Glanc, E. Gendron, F. Lacombe, D. Lafaille, J. F. Le Gargasson, and P. Lena, “Towards wide-field imaging with adaptive optics,” Opt. Commun. 230, 225–238 (2004). [CrossRef]

6.

J. Rha, R. S. Jonnal, K. E. Thorn, J. Qu, Y. Zhang, and D. T. Miller, “Adaptive optics flood-illumination camera for high speed retinal imaging,” Opt. Express 14, 4552–4569 (2006). [CrossRef] [PubMed]

7.

S. S. Choi, N. Doble, J. L. Hardy, S. M. Jones, J. L. Keltner, S. S. Olivier, and J. S. Werner, “In vivo imaging of the photoreceptor mosaic in retinal dystrophies and correlations with retinal function,” Invest. Ophthalmol. Visual Sci. 47, 2080–2092 (2006). [CrossRef]

8.

A. W. Dreher, J. F. Bille, and R. N. Weinreb, “Active optical depth resolution improvement of the laser tomographic scanner,” Appl. Opt. 28, 804–808 (1989). [CrossRef] [PubMed]

9.

A. Roorda, F. Romero-Borja, W. J. Donnelly, H. Queener, T. J. Hebert, and M. C. W. Campbell, “Adaptive optics scanning laser ophthalmoscopy,” Opt. Express 10, 405–412 (2002). [PubMed]

10.

D. X. Hammer, R. D. Ferguson, C. E. Bigelow, N. V. Iftimia, T. E. Ustun, and S. A. Burns, “Adaptive optics scanning laser ophthalmoscope for stabilized retinal imaging,” Opt. Express 8, 3354–3367 (2006). [CrossRef]

11.

D. T. Miller, J. Qu, R. S. Jonnal, and K. Thorn, “Coherence gating and adaptive optics in the eye,” Proc. SPIE 4956, 65–72 (2003). [CrossRef]

12.

B. Hermann, E. J. Fernandez, A. Unterhuber, H. Sattmann, A. F. Fercher, W. Drexler, P. M. Prieto, and P. Artal, “Adaptive-optics ultrahigh-resolution optical coherence tomography,” Opt. Lett. 29, 2142–2144 (2004). [CrossRef] [PubMed]

13.

Y. Zhang, J. Rha, R. S. Jonnal, and D. T. Miller, “Adaptive optics parallel spectral domain optical coherence tomography for imaging the living retina,” Opt. Express 13, 4792–4811 (2005). [CrossRef] [PubMed]

14.

R. J. Zawadzki, S. Jones, S. S. Olivier, M. Zhao, B. A. Bower, J. A. Izatt, S. S. Choi, S. Laut, and J. S. Werner, “Adaptive-optics optical coherence tomography for high-resolution and high-speed 3D retinal in vivo imaging,” Opt. Express 13, 8532–8546 (2005). [CrossRef] [PubMed]

15.

Y. Zhang, B. Cense, J. Rha, R. S. Jonnal, W. Gao, R. J. Zawadzki, J. S. Werner, S. Jones, S. Olivier, and D. T. Miller, “High-speed volumetric imaging of cone photoreceptors with adaptive optics spectral-domain optical coherence tomography,” Opt. Express 14, 4380–4394 (2006). [CrossRef] [PubMed]

16.

E. J. Fernández, B. Považvay, B. Hermann, A. Unterhuber, H. Sattmann, P. M. Prieto, R. Leitgeb, P. Ahnelt, P. Artal, and W. Drexler, “Three-dimensional adaptive optics ultrahigh-resolution optical coherence tomography using a liquid crystal spatial light modulator,” Vision Res. 45, 3432–3444 (2005). [CrossRef] [PubMed]

17.

D. Merino, C. Dainty, A. Bradu, and A. G. Podoleanu, “Adaptive optics enhanced simultaneous en-face optical coherence tomography and scanning laser ophthalmoscopy,” Opt. Express 8, 3345–3353 (2006). [CrossRef]

18.

G. Y. Yoon and D. R. Williams, “Visual performance after correcting the monochromatic and chromatic aberrations of the eye,” J. Opt. Soc. Am. A 19, 266–275 (2002). [CrossRef]

19.

P. Artal, L. Chen, E. J. Fernández, B. Singer, S. Manzanera, and D. R. Williams, “Neural compensation for the eye's optical aberrations,” J. Vision 4, 281–287 (2004). [CrossRef]

20.

L. Chen, P. B. Kruger, H. Hofer, B. Singer, and D. R. Williams, “Accommodation with higher-order monochromatic aberrations corrected with adaptive optics,” J. Opt. Soc. Am. A 23, 1–8 (2006). [CrossRef]

21.

J. Porter, H. Queener, J. Lin, K. Thorn, and A. A. S. Awwal, eds., Adaptive Optics for Vision Science: Principles, Practices, Design and Applications (Wiley, 2006). [CrossRef]

22.

N. Doble, “High-resolution, in vivo retinal imaging using adaptive optics and its future role in ophthalmology,” Expert Rev. Medical Devices 2, 205–216 (2005). [CrossRef]

23.

B. R Oppenheimer, D. L. Palmer, R. G. Dekany, A. Sivaramakrishnan, M. A. Ealey, and T. R. Price, “Investigating a Xinetics Inc. deformable mirror,” Proc. SPIE 3126, 569–579 (1997). [CrossRef]

24.

J. W. Hardy, Adaptive Optics for Astronomical Telescopes (Oxford U. Press, 1998).

25.

R. K. Tyson, Principles of Adaptive Optics, 2nd ed. (Academic, 1998).

26.

H. Hofer, P. Artal, B. Singer, J. L. Aragon, and D. R. Williams, “Dynamics of the eye's wave aberration,” J. Opt. Soc. Am. A 18, 497–506 (2001). [CrossRef]

27.

L. Diaz-Santana, C. Torti, I. Munro, P. Gasson, and C. Dainty, “Benefit of higher closed-loop bandwidths in ocular adaptive optics,” Opt. Express 11, 2597–2605 (2003). [CrossRef] [PubMed]

28.

S. A. Burns, S. Marcos, A. E. Elsner, and S. Bara, “Contrast improvement for confocal retinal imaging using phase correcting plates,” Opt. Lett. 27, 400–402 (2002). [CrossRef]

29.

E. J. Fernandez, L. Vabre, B. Hermann, A. Unterhuber, B. Povazay, and W. Drexler, “Adaptive optics with a magnetic deformable mirror: applications in the human eye,” Opt. Express 14, 8900–8917 (2006). [CrossRef] [PubMed]

30.

N. Doble and D. R. Williams, “The application of MEMS technology for adaptive optics in vision science,” IEEE J. Sel. Top. Quantum Electron. 10, 629–635 (2004). [CrossRef]

31.

G. V. Vdovin and P. M. Sarro, “Flexible mirror micromachined in silicon,” Appl. Opt. 34, 2968–2972 (1995). [CrossRef] [PubMed]

32.

E. J. Fernandez and P. Artal, “Membrane deformable mirror for adaptive optics: performance limits in visual optics,” Opt. Express 11, 1056–1069 (2003). [CrossRef] [PubMed]

33.

E. J. Fernandez, I. Iglesias, and P. Artal, “Closed-loop adaptive optics in the human eye,” Opt. Lett. 26, 746–748 (2001). [CrossRef]

34.

D.-U. Bartsch, L. Zhu, P. C. Sun, S. Fainman, and W. R. Freeman, “Retinal imaging with a low-cost micromachined membrane deformable mirror,” J. Biomedical Opt. 7, 451–456 (2002). [CrossRef]

35.

E. Dalimier and C. Dainty, “Comparative analysis of deformable mirrors for ocular adaptive optics,” Opt. Express 13, 4275–4285 (2005). [CrossRef] [PubMed]

36.

N. Doble, G. Yoon, L. Chen, P. Bierden, B. Singer, S. Olivier, and D. R. Williams, “The use of a microelectromechanical mirror for adaptive optics in the human eye,” Opt. Lett. 27, 1579–1581 (2002). [CrossRef]

37.

J. A. Perreault, T. G. Bifano, B. M. Levine, and M. N. Horenstein, “Adaptive optic correction using microelectromechanical deformable mirrors,” Opt. Eng. 41, 561–566 (2002). [CrossRef]

38.

L. N. Thibos and A. Bradley, “Use of liquid-crystal adaptive-optics to alter the refractive state of the eye,” Optom. Vision Sci. 74, 581–587 (1997). [CrossRef]

39.

F. Vargas-Martin, P. M. Prieto, and P. Artal, “Correction of the aberrations in the human eye with a liquid-crystal spatial light modulator: limits to performance,” J. Opt. Soc. Am. A 15, 2552–2562 (1998). [CrossRef]

40.

P. M. Prieto, E. J. Fernandez, S. Manzanera, and P. Artal, “Adaptive optics with a programmable phase modulator: applications in the human eye,” Opt. Express 12, 4059–4071 (2004). [CrossRef] [PubMed]

41.

F. H. Li, N. Mukohzaka, N. Yoshida, Y. Igasaki, H. Toyoda, T. Inoue, Y. Kobayashi, and T Hara, “Phase modulation characteristics analysis of optically-addressed parallel-aligned nematic liquid crystal phase-only spatial light modulator combined with a liquid crystal display,” Opt. Rev. 5, 174–178 (1998). [CrossRef]

42.

D. T. Miller, L. N. Thibos, and X. Hong, “Requirements for segmented correctors for diffraction-limited performance in the human eye,” Opt. Express 13, 275–289 (2005). [CrossRef] [PubMed]

43.

L. N. Thibos, R. A. Applegate, J. T. Schwiegerling, and R. Webb, and VISA Standards Taskforce Members, “Standards for reporting the optical aberrations of eyes,” J. Refract. Surg. 18, S652–S660 (2002). [PubMed]

44.

L. N. Thibos, X. Hong, A. Bradley, and X. Cheng, “Statistical variation of aberration structure and image quality in a normal population of healthy eyes,” J. Opt. Soc. Am. A 19, 2329–2348 (2002). [CrossRef]

45.

J. C. He, S. Marcos, R. H. Webb, and S. A. Burns, “Measurement of the wave-front aberration of the eye by a fast psychophysical procedure,” J. Opt. Soc. Am. A 15, 2449–2456 (1998). [CrossRef]

46.

R. H. Hudgin, “Wave-front compensation error due to finite element corrector size,” J. Opt. Soc. Am. 67, 393–395 (1977). [CrossRef]

47.

M. C. Roggemann and B. Welsh, Imaging Through Turbulence (CRC, 1996).

48.

N. Doble, M. Helmbrecht, M. Hart, and T. Juneau, “Advanced wave-front correction technology for the next generation of adaptive optics equipped ophthalmic instrumentation,” Proc. SPIE 5688, 125–132 (2006). [CrossRef]

49.

W. B. King, “Dependence of the Strehl ratio on the magnitude of the variance of the wave aberration,” J. Opt. Soc. Am. 58, 655–661 (1967). [CrossRef]

50.

J. Porter, A. Guirao, I. G. Cox, and D. R. Williams, “Monochromatic aberrations of the human eye in a large population,” J. Opt. Soc. Am. A 18, 1793–1803 (2001). [CrossRef]

51.

R. J. Zawadzki, S. S. Choi, J. S. Werner, S. M. Jones, D. Chen, S. S. Olivier, Y. Zhang, J. Rha, B. Cense, and D. T. Miller, “Two deformable mirror adaptive optics system for in vivo retinal imaging with optical coherence tomography,” presented at the 2006 Biomedical Optics Topical Meeting, Fort Lauderdale, Fla., USA, 22 March 2006.

52.

R. H. Webb, M. J. Albanese, Y. Zhou, T. Bifano, and S. A. Burns, “Stroke amplifier for deformable mirrors,” Appl. Opt. 43, 5330–5333 (2004). [CrossRef] [PubMed]

53.

O. C. Zienkiewicz, The Finite Element Method in Engineering Science, 2nd ed. (McGraw-Hill, 1971).

54.

J. H. Lee, T.-K. Uhm, and S.-K. Youn, “First-order analysis of thin-plate deformable mirrors,” J. Korean Phys. Soc. 44, 1412–1416 (2004).

55.

L. Arnold, “Influence functions of a thin shallow meniscus-shaped mirror,” Appl. Opt. 36, 2019–2028 (1997). [CrossRef] [PubMed]

56.

A. Menikoff, “Actuator influence functions of active mirrors,” Appl. Opt. 30, 833–838 (1991). [CrossRef] [PubMed]

57.

N. M. Putnam, H. J. Hofer, N. Doble, L. Chen, J. Carroll, and D. R. Williams, “The locus of fixation and the foveal cone mosaic,” J. Vision 5, 632–639 (2005). [CrossRef]

OCIS Codes
(010.1080) Atmospheric and oceanic optics : Active or adaptive optics
(330.0330) Vision, color, and visual optics : Vision, color, and visual optics
(330.4300) Vision, color, and visual optics : Vision system - noninvasive assessment
(330.4460) Vision, color, and visual optics : Ophthalmic optics and devices
(330.5370) Vision, color, and visual optics : Physiological optics

ToC Category:
Vision and color

History
Original Manuscript: October 16, 2006
Revised Manuscript: January 31, 2007
Manuscript Accepted: February 15, 2007
Published: June 20, 2007

Virtual Issues
Vol. 2, Iss. 8 Virtual Journal for Biomedical Optics

Citation
Nathan Doble, Donald T. Miller, Geunyoung Yoon, and David R. Williams, "Requirements for discrete actuator and segmented wavefront correctors for aberration compensation in two large populations of human eyes," Appl. Opt. 46, 4501-4514 (2007)
http://www.opticsinfobase.org/ao/abstract.cfm?URI=ao-46-20-4501


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References

  1. J. Liang, D. R. Williams, and D. T. Miller, "Supernormal vision and high-resolution retinal imaging through adaptive optics," J. Opt. Soc. Am. A 14, 2884-2892 (1997). [CrossRef]
  2. H. Hofer, L. Chen, G. Y. Yoon, B. Singer, Y. Yamauchi, and D. R. Williams, "Improvement in retinal image quality with dynamic correction of the eye's aberrations," Opt. Express 8, 631-643 (2001). [CrossRef] [PubMed]
  3. V. Larichev, P. V. Ivanov, N. G. Iroshnikov, V. I. Shmalhauzen, and L. J. Otten, "Adaptive system for eye-fundus imaging," Quantum Electron. 32, 902-908 (2002). [CrossRef]
  4. N. Ling, Y. Zhang, X. Rao, X. Li, C. Wang, Y. Hu, and W. Jiang, "Small table-top adaptive optical systems for human retinal imaging," Proc. SPIE 4825, 99-108 (2002). [CrossRef]
  5. M. Glanc, E. Gendron, F. Lacombe, D. Lafaille, J. F. Le Gargasson, and P. Lena, "Towards wide-field imaging with adaptive optics," Opt. Commun. 230, 225-238 (2004). [CrossRef]
  6. J. Rha, R. S. Jonnal, K. E. Thorn, J. Qu, Y. Zhang, and D. T. Miller, "Adaptive optics flood-illumination camera for high speed retinal imaging," Opt. Express 14, 4552-4569 (2006). [CrossRef] [PubMed]
  7. S. S. Choi, N. Doble, J. L. Hardy, S. M. Jones, J. L. Keltner, S. S. Olivier, and J. S. Werner, "In vivo imaging of the photoreceptor mosaic in retinal dystrophies and correlations with retinal function," Invest. Ophthalmol. Visual Sci. 47, 2080-2092 (2006). [CrossRef]
  8. A. W. Dreher, J. F. Bille, and R. N. Weinreb, "Active optical depth resolution improvement of the laser tomographic scanner," Appl. Opt. 28, 804-808 (1989). [CrossRef] [PubMed]
  9. A. Roorda, F. Romero-Borja, W. J. Donnelly, H. Queener, T. J. Hebert, and M. C. W. Campbell, "Adaptive optics scanning laser ophthalmoscopy," Opt. Express 10, 405-412 (2002). [PubMed]
  10. D. X. Hammer, R. D. Ferguson, C. E. Bigelow, N. V. Iftimia, T. E. Ustun, and S. A. Burns, "Adaptive optics scanning laser ophthalmoscope for stabilized retinal imaging," Opt. Express 8, 3354-3367 (2006). [CrossRef]
  11. D. T. Miller, J. Qu, R. S. Jonnal, and K. Thorn, "Coherence gating and adaptive optics in the eye," Proc. SPIE 4956, 65-72 (2003). [CrossRef]
  12. B. Hermann, E. J. Fernandez, A. Unterhuber, H. Sattmann, A. F. Fercher, W. Drexler, P. M. Prieto, and P. Artal, "Adaptive-optics ultrahigh-resolution optical coherence tomography," Opt. Lett. 29, 2142-2144 (2004). [CrossRef] [PubMed]
  13. Y. Zhang, J. Rha, R. S. Jonnal, and D. T. Miller, "Adaptive optics parallel spectral domain optical coherence tomography for imaging the living retina," Opt. Express 13, 4792-4811 (2005). [CrossRef] [PubMed]
  14. R. J. Zawadzki, S. Jones, S. S. Olivier, M. Zhao, B. A. Bower, J. A. Izatt, S. S. Choi, S. Laut, and J. S. Werner, "Adaptive-optics optical coherence tomography for high-resolution and high-speed 3D retinal in vivo imaging," Opt. Express 13, 8532-8546 (2005). [CrossRef] [PubMed]
  15. Y. Zhang, B. Cense, J. Rha, R. S. Jonnal, W. Gao, R. J. Zawadzki, J. S. Werner, S. Jones, S. Olivier, and D. T. Miller, "High-speed volumetric imaging of cone photoreceptors with adaptive optics spectral-domain optical coherence tomography," Opt. Express 14, 4380-4394 (2006). [CrossRef] [PubMed]
  16. E. J. Fernández, B. Povazvay, B. Hermann, A. Unterhuber, H. Sattmann, P. M. Prieto, R. Leitgeb, P. Ahnelt, P. Artal, and W. Drexler, "Three-dimensional adaptive optics ultrahigh-resolution optical coherence tomography using a liquid crystal spatial light modulator," Vision Res. 45, 3432-3444 (2005). [CrossRef] [PubMed]
  17. D. Merino, C. Dainty, A. Bradu, and A. G. Podoleanu, "Adaptive optics enhanced simultaneous en-face optical coherence tomography and scanning laser ophthalmoscopy," Opt. Express 8, 3345-3353 (2006). [CrossRef]
  18. G. Y. Yoon and D. R. Williams, "Visual performance after correcting the monochromatic and chromatic aberrations of the eye," J. Opt. Soc. Am. A 19, 266-275 (2002). [CrossRef]
  19. P. Artal, L. Chen, E. J. Fernández, B. Singer, S. Manzanera, and D. R. Williams, "Neural compensation for the eye's optical aberrations," J. Vision 4, 281-287 (2004). [CrossRef]
  20. L. Chen, P. B. Kruger, H. Hofer, B. Singer, and D. R. Williams, "Accommodation with higher-order monochromatic aberrations corrected with adaptive optics," J. Opt. Soc. Am. A 23, 1-8 (2006). [CrossRef]
  21. J. Porter, H. Queener, J. Lin, K. Thorn, and A. A. S. Awwal, eds., Adaptive Optics for Vision Science: Principles, Practices, Design and Applications (Wiley, 2006). [CrossRef]
  22. N. Doble, "High-resolution, in vivo retinal imaging using adaptive optics and its future role in ophthalmology," Expert Rev. Medical Devices 2, 205-216 (2005). [CrossRef]
  23. B. R Oppenheimer, D. L. Palmer, R. G. Dekany, A. Sivaramakrishnan, M. A. Ealey, and T. R. Price, "Investigating a Xinetics Inc. deformable mirror," Proc. SPIE 3126, 569-579 (1997). [CrossRef]
  24. J. W. Hardy, Adaptive Optics for Astronomical Telescopes (Oxford U. Press, 1998).
  25. R. K. Tyson, Principles of Adaptive Optics, 2nd ed. (Academic, 1998).
  26. H. Hofer, P. Artal, B. Singer, J. L. Aragon, and D. R. Williams, "Dynamics of the eye's wave aberration," J. Opt. Soc. Am. A 18, 497-506 (2001). [CrossRef]
  27. L. Diaz-Santana, C. Torti, I. Munro, P. Gasson, and C. Dainty, "Benefit of higher closed-loop bandwidths in ocular adaptive optics," Opt. Express 11, 2597-2605 (2003). [CrossRef] [PubMed]
  28. S. A. Burns, S. Marcos, A. E. Elsner, and S. Bara, "Contrast improvement for confocal retinal imaging using phase correcting plates," Opt. Lett. 27, 400-402 (2002). [CrossRef]
  29. E. J. Fernandez, L. Vabre, B. Hermann, A. Unterhuber, B. Povazay, and W. Drexler, "Adaptive optics with a magnetic deformable mirror: applications in the human eye," Opt. Express 14, 8900-8917 (2006). [CrossRef] [PubMed]
  30. N. Doble and D. R. Williams, "The application of MEMS technology for adaptive optics in vision science," IEEE J. Sel. Top. Quantum Electron. 10, 629-635 (2004). [CrossRef]
  31. G. V. Vdovin and P. M. Sarro, "Flexible mirror micromachined in silicon," Appl. Opt. 34, 2968-2972 (1995). [CrossRef] [PubMed]
  32. E. J. Fernandez and P. Artal, "Membrane deformable mirror for adaptive optics: performance limits in visual optics," Opt. Express 11, 1056-1069 (2003). [CrossRef] [PubMed]
  33. E. J. Fernandez, I. Iglesias, and P. Artal, "Closed-loop adaptive optics in the human eye," Opt. Lett. 26, 746-748 (2001). [CrossRef]
  34. D.-U. Bartsch, L. Zhu, P. C. Sun, S. Fainman, and W. R. Freeman, "Retinal imaging with a low-cost micromachined membrane deformable mirror," J. Biomedical Opt. 7, 451-456 (2002). [CrossRef]
  35. E. Dalimier and C. Dainty, "Comparative analysis of deformable mirrors for ocular adaptive optics," Opt. Express 13, 4275-4285 (2005). [CrossRef] [PubMed]
  36. N. Doble, G. Yoon, L. Chen, P. Bierden, B. Singer, S. Olivier, and D. R. Williams, "The use of a microelectromechanical mirror for adaptive optics in the human eye," Opt. Lett. 27, 1579-1581 (2002). [CrossRef]
  37. J. A. Perreault, T. G. Bifano, B. M. Levine, and M. N. Horenstein, "Adaptive optic correction using microelectromechanical deformable mirrors," Opt. Eng. 41, 561-566 (2002). [CrossRef]
  38. L. N. Thibos and A. Bradley, "Use of liquid-crystal adaptive-optics to alter the refractive state of the eye," Optom. Vision Sci. 74, 581-587 (1997). [CrossRef]
  39. F. Vargas-Martin, P. M. Prieto, and P. Artal, "Correction of the aberrations in the human eye with a liquid-crystal spatial light modulator: limits to performance," J. Opt. Soc. Am. A 15, 2552-2562 (1998). [CrossRef]
  40. P. M. Prieto, E. J. Fernandez, S. Manzanera, and P. Artal, "Adaptive optics with a programmable phase modulator: applications in the human eye," Opt. Express 12, 4059-4071 (2004). [CrossRef] [PubMed]
  41. F. H. Li, N. Mukohzaka, N. Yoshida, Y. Igasaki, H. Toyoda, T. Inoue, Y. Kobayashi, and T Hara, "Phase modulation characteristics analysis of optically-addressed parallel-aligned nematic liquid crystal phase-only spatial light modulator combined with a liquid crystal display," Opt. Rev. 5, 174-178 (1998). [CrossRef]
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