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Optics Express

Optics Express

  • Editor: Andrew M. Weiner
  • Vol. 22, Iss. 15 — Jul. 28, 2014
  • pp: 17644–17656
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Exploring the depth range for three-dimensional laser machining with aberration correction

P. S. Salter, M. Baum, I. Alexeev, M. Schmidt, and M. J. Booth  »View Author Affiliations


Optics Express, Vol. 22, Issue 15, pp. 17644-17656 (2014)
http://dx.doi.org/10.1364/OE.22.017644


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Abstract

The spherical aberration generated when focusing from air into another medium limits the depth at which ultrafast laser machining can be accurately maintained. We investigate how the depth range may be extended using aberration correction via a liquid crystal spatial light modulator (SLM), in both single point and parallel multi-point fabrication in fused silica. At a moderate numerical aperture (NA = 0.5), high fidelity fabrication with a significant level of parallelisation is demonstrated at the working distance of the objective lens, corresponding to a depth in the glass of 2.4 mm. With a higher numerical aperture (NA = 0.75) objective lens, single point fabrication is demonstrated to a depth of 1 mm utilising the full NA, and deeper with reduced NA, while maintaining high repeatability. We present a complementary theoretical model that enables prediction of the effectiveness of SLM based correction for different aberration magnitudes.

© 2014 Optical Society of America

1. Introduction

Ultrashort pulsed laser fabrication [1

1. R. R. Gattass and E. Mazur, “Femtosecond laser micromachining in transparent materials,” Nat. Photon. 2, 219–225 (2008). [CrossRef]

] in materials, such as glass or fused silica, is receiving increasing attention due to a range of interesting applications. The potential to generate accurately micron scale features in three dimensions has been previously used to great effect in waveguide circuits [2

2. K. M. Davis, K. Miura, N. Sugimoto, and K. Hirao, “Writing waveguides in glass with a femtosecond laser,” Opt. Lett. 21, 1729–1731 (1996). [CrossRef] [PubMed]

6

6. T. Meany, S. Gross, N. Jovanovic, A. Arriola, M. J. Steel, and M. J. Withford, “Towards low-loss lightwave circuits for non-classical optics at 800 and 1,550 nm,” Appl. Phys. A 114, 113–118 (2014). [CrossRef]

], microfluidic chips [7

7. F. He, H. Xu, Y. Cheng, J. Ni, H. Xiong, Z. Xu, K. Sugioka, and K. Midorikawa, “Fabrication of microfluidic channels with a circular cross section using spatiotemporally focused femtosecond laser pulses,” Opt. Lett. 35, 1106–1108 (2010). [CrossRef] [PubMed]

, 8

8. F. Bragheri, P. Minzioni, R. M. Vazquez, N. Bellini, P. Paie, C. Mondello, R. Ramponi, I. Cristiani, and R. Osellame, “Optofluidic integrated cell sorter fabricated by femtosecond lasers,” Lab Chip 12, 3779–3784 (2012). [CrossRef] [PubMed]

], volume optics [9

9. T. D. Gerke and R. Piestun, “Aperiodic volume optics,” Nat. Photon. 4, 188–193 (2010). [CrossRef]

], welding [10

10. F. Zimmermann, S. Richter, S. Doring, A. Tunnermann, and S. Nolte, “Ultrastable bonding of glass with femtosecond laser bursts,” Appl. Opt. 52, 1149–1154 (2013). [CrossRef] [PubMed]

] and the fabrication of microcomponents [11

11. B. Lenssen and Y. Bellouard, “Optically transparent glass micro-actuator fabricated by femtosecond laser exposure and chemical etching,” Appl. Phys. Lett. 101, 103503 (2012). [CrossRef]

]. The key benefit of using ultrashort pulses for the fabrication is that the features generated can be highly localised in three dimensions. However, problems arise with 3D fabrication due to refraction of rays at the sample surface, giving rise to a depth dependent spherical aberration [12

12. M. J. Booth, M. A. A. Neil, and T. Wilson, “Aberration correction for confocal imaging in refractive-index-mismatched media,” J. Microsc. 192, 90–98 (1998). [CrossRef]

14

14. N. Huot, R. Stoian, A. Mermillod-Blondin, C. Mauclair, and E. Audouard, “Analysis of the effects of spherical aberration on ultrafast laser-induced refractive index variation in glass,” Opt. Express 15, 12395–12408 (2007). [CrossRef] [PubMed]

]. The magnitude of the aberration is strongly dependent on both the focusing depth and the numerical aperture (NA) of the focusing optic. Problems associated with the aberration may be circumvented by using a very low NA (0.1 – 0.2) objective [15

15. V. Diez-Blanco, J. Siegel, A. Ferrer, A. R. de la Cruz, and J. Solis, “Deep subsurface waveguides with circular cross section produced by femtosecond laser writing,” Appl. Phys. Lett. 91, 051104 (2007). [CrossRef]

] and sacrificing spatial resolution. Alternatively, an objective with higher NA and a correction collar may be used [16

16. C. Hnatovsky, R. S. Taylor, E. Simova, V. R. Bhardwaj, D. M. Rayner, and P. B. Corkum, “High-resolution study of photoinduced modification in fused silica produced by a tightly focused femtosecond laser beam in the presence of aberrations,” J. Appl. Phys. 98, 013517 (2005). [CrossRef]

] which is effective within a range but often does not accommodate the full working distance and is not suitable for dynamic application. The focal distortion due to the aberration may actually be utilised in some applications, such as for the generation of an axial array of voids [17

17. C. Mauclair, A. Mermillod-Blondin, S. Landon, N. Huot, A. Rosenfeld, I. V. Hertel, E. Audouard, I. Myiamoto, and R. Stoian, “Single pulse ultrafast laser imprinting of axial dot arrays in bulk glasses,” Opt. Lett. 36, 325–327 (2011). [CrossRef] [PubMed]

].

Adaptive optic elements, in particular liquid crystal spatial light modulators (SLMs), have become increasingly prevalent in recent years to counteract the effects of aberrations in laser fabrication. Implementations have included very high precision machining at high NA [18

18. B. P. Cumming, A. Jesacher, M. J. Booth, T. Wilson, and M. Gu, “Adaptive aberration compensation for three-dimensional micro-fabrication of photonic crystals in lithium niobate,” Opt. Express 19, 9419–9425 (2011). [CrossRef] [PubMed]

, 19

19. E. H. Waller, M. Renner, and G. von Freymann, “Active aberration- and point-spread-function control in direct laser writing,” Opt. Express 20, 24949–24956 (2012). [CrossRef] [PubMed]

], incorporation of aberration correction with parallelisation [20

20. A. Jesacher and M. J. Booth, “Parallel direct laser writing in three dimensions with spatially dependent aberration correction,” Opt. Express 18, 21090–21099 (2010). [CrossRef] [PubMed]

], longitudinal waveguide writing [21

21. C. Mauclair, A. Mermillod-Blondin, N. Huot, E. Audouard, and R. Stoian, “Ultrafast laser writing of homogeneous longitudinal waveguides in glasses using dynamic wavefront correction,” Opt. Express 16, 5481–5492 (2008). [CrossRef] [PubMed]

] and removal of aberrations induced near the sample edge [22

22. P. S. Salter and M. J. Booth, “Focussing over the edge: adaptive subsurface laser fabrication up to the sample face,” Opt. Express 20, 19978–19989 (2012). [CrossRef] [PubMed]

]. Here, we explore both theoretically and experimentally the limits for aberration correction using a SLM when machining deep inside fused silica at different numerical apertures.

2. Focussing through a mismatch in refractive index

2.1. Spherical aberration and defocus phase functions

When light is focused from a medium with refractive index (n1) into a sample with a differing refractive index (n2), refraction of rays at the interface leads to an aberration of the focus. Typically the focal intensity distribution is both distorted and refocused, as demonstrated by Fig. 1(a). The effects are particularly pronounced for high numerical aperture (NA) objective lenses and/or when there is a large difference between the refractive index of the sample and that of the objective immersion medium. By considering the optical path length difference for rays as a function of their angular distribution exiting the objective [12

12. M. J. Booth, M. A. A. Neil, and T. Wilson, “Aberration correction for confocal imaging in refractive-index-mismatched media,” J. Microsc. 192, 90–98 (1998). [CrossRef]

], the phase in the pupil plane of the objective lens required to cancel the aberration induced by the interface is written as:
ϕSA(ρ)=2πdnomλ(n22(NAρ)2n12(NAρ)2)
(1)
where λ is the wavelength of the light, ρ is the normalised pupil radius and dnom is the nominal depth to which we are focusing within the sample. An example cut through such a phase distribution is presented in Fig. 1(b), for an example lens with NA=0.75, focusing from air (n1 = 1) into fused silica (n2 = 1.45 at λ = 790 nm) to a depth of dnom = 100 μm. The aberration contains a defocus element which leads to the depth of maximum intensity in the sample dact being greater than the nominal focusing depth dnom. As this defocus is simply equivalent to a translation of the sample stage, it is standard practice to reduce the magnitude of the required SLM aberration correction by removing this component. The defocus-free spherical aberration ϕ̂SA(ρ) function is obtained as:
ϕ^SA(ρ)=ϕSAϕSA,Dn2Dn2,Dn2Dn2
(2)
where Dn2 is the phase required to defocus to a depth dnom in the sample medium. ϕ′SA and D′n2 correspond to the functions ϕSA and Dn2 following subtraction of their respective mean values, while 〈ϕ′SA, D′n2〉 denotes an inner product between two functions defined as:
X,Y=XYρdρdθ
(3)
where ρ and θ represent normalised polar coordinates within the pupil. Since the analysis should be generally applicable to objective lenses with a high numerical aperture, it is important to employ a spherical, as opposed to a quadratic, form for the defocus phase [23

23. E. J. Botcherby, R. Juskaitis, M. J. Booth, and T. Wilson, “An optical technique for remote focusing in microscopy,” Opt. Commun. 281, 880–887 (2008). [CrossRef]

]:
Dn2(ρ)=2πdnomλn22(NAρ)2
(4)
Figure 1(c) displays the radial cut through the aberration phase from Fig. 1(b) with the defocus phase element removed as described in Eq. (2). The spherical aberration that leads to focal distortion is clearly apparent. The total phase range has dropped by a factor of ten following defocus removal, substantially reducing the demands on the adaptive optic element. Following the notation of Cumming et al. [24

24. B. P. Cumming, M. D. Turner, G. E. Schroder-Turk, S. Debbarma, B. Luther-Davies, and M. Gu, “Adaptive optics enhanced direct laser writing of high refractive index gyroid photonic crystals in chalcogenide glass,” Opt. Express 22, 689–698 (2014). [CrossRef] [PubMed]

], we denote 1/s = 1 + 〈ϕ′SA, D′n2〉/〈D′n2, D′n2〉 such that the defocus-free spherical aberration compensation function may be written as:
ϕ^SA(ρ)=2πdnomsλ(sn12(NAρ)2n22(NAρ)2)
(5)

Fig. 1 (a) Aberration generated during focusing by refraction at an interface. (b) The pupil phase corresponding to the aberration, for a 0.75 NA lens focusing from air (n1 = 1) into fused silica (n2 = 1.45) at λ = 790 nm to a depth of dnom = 100 μm. (c) The phase from (b) with the defocus element removed. (d) A plot showing the ratio of nominal to actual focusing depth as a function of objective NA.

The required stage position can be found by relating the actual focus dact to the nominal focal depth dnom through:
dact=dnom/s=dnom(1+ϕSA,Dn2Dn2,Dn2)
(6)
The plot in Fig. 1(d) displays the relationship between dact and dnom as a function of NA. At low NA (in the paraxial regime) the actual focal depth is increased simply by a factor of n2/n1 = 1.45. At higher numerical apertures (NA ≳ 0.5), the ratio of dact to dnom starts to increase, reaching ∼ 1.9 for NA = 0.95. This scaling factor is required for accurate 3D fabrication, in order to convert desired structural dimensions dact to the experimental control of the axial separation between specimen and objective lens.

2.2. Depth aberration correction range using a SLM

It would be useful to predict the range of depth aberrations that can be successfully corrected using a liquid crystal SLM. Although limited to a [0, 2π) rad phase range, large amplitude phase patterns can still be accommodated on SLMs using phase wrapping. The phase wrap transition from 0 → 2π is ideally infinitely sharp but, in real liquid crystal devices there is a finite width t to the phase wrap. Light incident on the area of the SLM occupied by phase wraps does not contribute constructively to the focal formation. Thus, the performance of the SLM starts to diminish as the gradient required in the compensation phase approaches the limit of a 2π change over the width of the wrap t.

From inspection of Fig. 1(c), it is clear that the (dimensionless) maximum gradient gmax in the correction phase occurs at the pupil edge ρ = 1:
gmax=dnomg=dnom[d(ϕ^SA/dnom)dρ]ρ=1
(7)
=dnom2πNA2λs(1n22NA2sn12NA2)
(8)
We set arbitrarily a criterion for the upper bound of aberration compensation that gmax = π/t′, where t′ is the width of a phase wrap normalised to the radius of the effective pupil on the SLM. Using this criterion, in the region of the maximum phase gradient the SLM is expected to modulate the light as desired with approximately 50% of the theoretical maximum efficiency, as phase wraps take up half of the SLM area. If the gradient becomes larger, the efficiency of light modulation at the edge of the pupil will become negligible and effectively reduce the NA of the system. Thus, we can define a maximum depth dmax at which we can perform aberration compensated fabrication using the full NA of the system as:
dmax=πtgs
(9)
where we have used Eq. (6) to convert a nominal into an actual focal depth and g′, as defined in Eq. (7), is the maximum gradient in the pupil, per unit focussing depth.

The value of t is specific to a particular SLM module. We have previously characterised the SLM for our system (X10468-02, Hamamatsu Photonics), using a technique measuring the first order diffraction efficiency as a function of blazed grating period, to find t = 1.175 pixels [25

25. P. S. Salter, Z. Iqbal, and M. J. Booth, “Analysis of the three-dimensional focal positioning capability of adaptive optic elements,” Int. J. Optomechatronics 7, 1–14 (2013). [CrossRef]

]. Equation (9) depends on the normalised wrap width t′ = t/R, where R is the physical radius in pixels of the phase pattern on the SLM. This radius is determined by the size of the objective pupil and the magnification between the SLM and objective. However, as a demonstration we take a value of R = 250 pixels (the SLM dimensions are 792 × 600 pixels, so a phase pattern of diameter 500 pixels fills most of the SLM while allowing some degree of fine adjustment in the alignment). Using this fixed value of R, Fig. 2(a) shows the maximum depth dmax as a function of objective lens NA for focusing from air (n1 = 1) into fused silica (n2 = 1.45) at a wavelength of λ = 790 nm. It is apparent that as the NA increases there is a sharp drop in dmax from the paraxial regime (NA=0.1) where dmax = 10 m to dmax = 120 μm at NA=0.95. Figure 2(b) and 2(c) display the associated SLM phase pattern for the 0.95 NA lens, where it can be seen that toward the pupil edge the distance between phase wraps is approximately 2 pixels ≈ 2t.

Fig. 2 (a) Theoretical plot of the maximum focal depth dmax that can be compensated for aberrations in our system as a function of NA, when focusing from air (n1 = 1) into fused silica (n2 = 1.45) at λ = 790 nm. (b) The associated phase pattern to be displayed on the SLM at NA = 0.95, when dmax = 120 μm. The inset illustrates the large phase gradients at the edge of the pupil, which are at the limit of the SLM capabilities. (c) A plot of the SLM phase along the red line shown in (b).

3. Experimental system

Figure 3 shows a schematic of the experimental layout. The pulses emitted from the regeneratively amplified titanium sapphire laser (Solstice, Newport/Spectra Physics, 100 fs pulse length, repetition rate 1 kHz, central wavelength 790 nm) were attenuated using a rotatable half-wave plate and a Glan-Laser polariser. The expanded beam was directed onto the reflective phase-only liquid crystal SLM. The SLM and the pupil plane of the objective were imaged onto one another by a 4 f system, composed of two achromatic doublet lenses L1 and L2. The focal lengths of L1 and L2 were specified for particular objective lenses to achieve the optimum degree of magnification between the SLM and objective while maintaining a 4 f image configuration. Two objective lenses were used in this study: (i) a 0.5 NA 20× Zeiss lens with a pupil diameter of 8.2 mm, a working distance of 1.6 mm and internal correction for focusing through a 170 μm coverglass. The focal lengths of L1 and L2 were 300 mm and 250 mm respectively, leading to an effective pupil of diameter 490 pixels on the SLM. (ii) a 0.75 NA 80× Olympus ULWD lens with a working distance of 4.1 mm and no internal correction. To accommodate the smaller pupil of this lens (3.375 mm), L1 and L2 were changed for lenses with focal lengths 400 mm and 150 mm respectively, resulting in a SLM pupil of diameter 450 pixels. The sample used for machining was high grade fused silica (Schott Lithosil Q0) polished on all sides. The sample was mounted on a three axis air-bearing translation stage, (Aerotech ABL10100 (x, y) and ANT95-3-V (z)). An LED illuminated transmission brightfield microscope enabled inspection of the specimen during fabrication.

Fig. 3 The experimental system. All lenses are achromatic doublets. The focal lengths of L1 and L2 are chosen to image the SLM onto the pupil of a particular objective lens with optimum magnification. The phase pattern shown was diplayed on the SLM to remove all system induced aberrations.

4. Aberration corrected fabrication at NA=0.5

4.1. Single point fabrication

An objective lens with a numerical aperture of 0.5 is routinely used in 3D laser machining, since submicron lateral resolution is achievable combined with working distances of over 1 mm. From inspection of Fig. 2, we expect that the SLM correction of spherical aberration is possible up to depths greater than 1 cm. Indeed, analysis of Eq. (5) predicts that the Strehl ratio [28

28. M. Born and E. Wolf, Principles of Optics, 4th ed. (Pergamon, 1970).

] remains above 0.8, providing a good indication of near-diffraction limited operation, for focussing over a depth range of 210 μm in fused silica, even without any aberration correction. Since many objectives, including the lens used in this study, are internally corrected for spherical aberration arising from a 170 μm thick coverglass the effective focussing range is up to 380 μm where aberrations have a negligible effect. However, when focussing deeper aberration compensation becomes necessary.

At a depth of 750 μm, the aberration can simply be removed using a phase pattern on the SLM [Fig. 4(a)] as shown by the point fabrication in Fig. 4(b). Each point was fabricated by five consecutive pulses of energy 0.1 μJ incident in the positive z direction. Five pulses were used, as opposed to one, to create an increased level of uniformity between adjacent fabricated features. The required aberration correction was predicted using the nominal focal depth, which is equivalent to the z stage translation. Feedback aberration correction, using either the energy threshold for fabrication [18

18. B. P. Cumming, A. Jesacher, M. J. Booth, T. Wilson, and M. Gu, “Adaptive aberration compensation for three-dimensional micro-fabrication of photonic crystals in lithium niobate,” Opt. Express 19, 9419–9425 (2011). [CrossRef] [PubMed]

, 29

29. R. D. Simmonds, P. S. Salter, A. Jesacher, and M. J. Booth, “Three dimensional laser microfabrication in diamond using a dual adaptive optics system,” Opt. Express 19, 24122–24128 (2011). [CrossRef] [PubMed]

] or the intensity of the plasma emission generated in the focal volume [30

30. A. Jesacher, G. D. Marshall, T. Wilson, and M. J. Booth, “Adaptive optics for direct laser writing with plasma emission aberration sensing,” Opt. Express 18, 656–661 (2010). [CrossRef] [PubMed]

], was not necessary due to the relatively low sensitivity to the aberration. Without aberration correction [Fig. 4(c)], the pulse energy required for fabrication increases to 0.18 μJ and there are signs of focal elongation. Increasing the pulse energy to 0.3 μJ clearly reveals the focal elongation caused by the aberration: the fabrication stretches over a range of 25 μm along the optic axis. The point at which the material modification is most pronounced is not located in the plane we might expect from Eq. (6), but has shifted approximately 10 μm closer to the surface. This is a direct consequence of the aberrated intensity distribution in the focal region, since the point of maximum intensity is axially shifted from the ‘defocus-free’ plane. The plots contained in the lower part of Figs. 4(b) and 4(c) displaying the expected theoretical intensity distributions with the rms defocus phase removed by Eq. (2) elucidate this point, which is in fact extremely important for accurate 3D fabrication. If the depth induced spherical aberration is not corrected, the actual depth for the peak focal intensity is very hard to predict as the shift is non-linear and discontinuous with respect to focussing depth [31

31. P. Torok, P. Varga, Z. Laczik, and G. R. Booker, “Electromagnetic diffraction of light focused through a planar interface between materials of mismatched refractive indices: an integral representation,” J. Opt. Soc. Am. A 12, 325–332 (1995). [CrossRef]

].

Fig. 4 Single-focus fabrication at a depths of 0.75 mm (a)–(c) and 2.4 mm (d)–(f) in fused silica, with laser pulses incident along the positive z direction, using the 0.5 NA objective. Each microstructure was created by 5 consecutive pulses, with energy as indicated. The scale bar represents 10 μm in all images. The features shown in (b) and (e) were fabricated using the phase patterns shown in (a) and (d), respectively, to compensate the depth dependent spherical aberration. The features shown in (c) and (f) were generated without any aberration compensation. The dashed line indicates the same z plane for image pairs (b), (c) and (e), (f). In (b) and (c) a plot of the theoretically predicted intensity distribution at focus is also included with the same spatial scale as the experimental images.

At a depth 2.4 mm, corresponding to the full working distance of the lens, the effects of the spherical aberration are very pronounced. Predictive aberration correction using the phase shown in Fig. 4(d) allowed reliable fabrication of features at the same pulse energy as at shallower depths. The single point fabrication extends over a distance of 4 μm along the optic axis and comprised three voids [Fig. 4(e)]. The presence of multiple voids is due to the multi-pulse nature of the fabrication, where pulses are influenced by the structural modification generated by their predecessors [32

32. E. Toratani, M. Kamata, and M. Obara, “Self-fabrication of void array in fused silica by femtosecond laser processing,” Appl. Phys. Lett. 87, 171103 (2005). [CrossRef]

, 33

33. K. Mishchik, G. Cheng, G. Huo, I. M. Burakov, C. Mauclair, A. Mermillod-Blondin, A. Rosenfeld, Y. Ouerdane, A. Boukenter, O. Parriaux, and R. Stoian, “Nanosize structural modifications with polarization functions in ultrafast laser irradiated bulk fused silica,” Opt. Express 18, 24809–24824 (2010). [CrossRef] [PubMed]

]. When appropriate aberration compensation is applied, the train of 5 pulses used for fabrication created either two or three voids closely spaced along the optic axis at all the depths tested. Without any aberration compensation, the pulse energy required for fabrication increased by an order of magnitude and features extended over 100 μm along the optic axis are generated as seen in Fig. 4(f). It is difficult to confirm the driving mechanism behind the axial extent of the features: (i) the spherical aberration arising from refraction at the sample surface is predicted to generate an intensity distribution axially stretched over 100 μm and (ii) the focal distortion dictates that a higher pulse energy is needed for fabrication, raising the peak power in the fused silica above the critical power for self focussing by the Kerr effect [34

34. L. Sudrie, A. Couairon, M. Franco, B. Lamouroux, B. Prade, S. Tzortzakis, and A. Mysyrowicz, “Femtosecond laser-induced damage and filamentary propagation in fused silica,” Phys. Rev. Lett. 89, 186601 (2002). [CrossRef] [PubMed]

]. It is likely that the filamentation observed is a combination of these two effects.

4.2. Multi-point fabrication

The analysis of Section 2.2, predicts that aberration compensation is possible to a depth of 1 cm using our experimental system. However, the working distance of the objective limited us to a depth of 2.4 mm, such that the full dynamic range of the SLM could not be fully utilised. Therefore, the remaining flexibility of the SLM could provide additional functionality, such as the generation of multiple foci, while still correcting for the aberration. A hologram was generated using a modified Gerchberg-Saxton algorithm to create a three dimensional face centred cubic lattice of foci around the zero order spot [20

20. A. Jesacher and M. J. Booth, “Parallel direct laser writing in three dimensions with spatially dependent aberration correction,” Opt. Express 18, 21090–21099 (2010). [CrossRef] [PubMed]

]. The intensity of the zero order spot was reduced through destructive interference with an overlaying lattice point. The lattice comprised 196 spots in a 7×7×4 configuration with a spot separation of 12 μm. The associated phase pattern is shown in Fig. 5(a1).

Fig. 5 (a) Holograms used without (a1) and with (a2) aberration correction. Parallel fabrication with aberration correction at actual depth of 0.15 mm (b) and 2.4 mm (c) in fused silica. Both the structures were fabricated by ten consecutive pulses of energy 19 μJ. The focussed laser pulses were incident along the positive z direction. (d) Parallel fabrication at a depth of 2.4 mm in fused silica without aberration correction, using ten consecutive pulses of energy 57 μJ.

The multi-foci lattice was initially fabricated at a depth of 0.15 mm, which was essentially aberration free due to the internal coverglass correction of the objective lens. The lattice was accurately fabricated as shown in Fig. 5(b), using ten consecutive pulses of energy 19 μJ. It should be noted that the ratio of this pulse energy to that needed for fabrication from a single focus is 190, where there are 196 spots in the array showing an efficient redistribution of energy by the calculated hologram. At a depth of 2.4 mm, the full working distance of the lens, multi-foci fabrication was achieved with high uniformity and the same pulse energy [Fig. 5(c)] using predictive aberration correction, Fig. 5(a2). Without any aberration correction at 2.4 mm depth, the pulse energy needed to be raised threefold to see clear evidence of fabrication, Fig. 5(d). However, the definition of the lattice is completely lost due to the severe effects of aberrations. The fabrication stretched over 250 μm along the optic axis. Note that although the holograms in Figs. 5(a1) and 5(a2) appear very similar, the small phase change between the two has a marked effect on the fabrication. It can be seen that aberration correction is essential for generating multiple foci holographically in the presence of only moderate aberration. There is sufficient dynamic range from the SLM to both correct the depth dependent aberration and create a large number of foci in a 3D lattice.

5. Aberration corrected fabrication at NA=0.75

In order to demonstrate higher resolution fabrication, we employed a long working distance0.75 NA objective. Since the axial resolution is proportional to the squared inverse of the NA, an increase in axial resolution by a factor of 2.25 was expected relative to the results of Section 4. However, the analysis of Section 2.2 indicates that there should be an increased sensitivity to the depth-dependent spherical aberration. For this NA, the Strehl ratio drops to 0.8 at a focussing depth of just 20 μm in the fused silica. As the objective does not have internal lens correction for spherical aberration, the aberration correction becomes important at all depths.

Fig. 6 (a) Phase pattern used to compensate aberrations focussing to a depth of 1.1 mm in fused silica at NA=0.75 to fabricate the single shot shown in (b) using a pulse energy of 0.2 μJ. (c) Single point features fabricated with no aberration compensation, with pulse energies as indicated. (d) Fabrication of continuous features at a depth of 2 mm with (d1 and d2) and without aberration compensation (d3 and d4).

It was still possible to perform controlled fabrication at greater depths than that predicted by the analysis of Section 2.2. Figure 6(d) shows continuous tracks fabricated at a depth of 2 mm in fused silica. At this depth the phase gradient at the edge of the pupil exceeded the capabilities of the SLM. The effect was a reduction in the numerical aperture of the system, an associated reduction in resolution and a higher pulse energy needed for fabrication. The tracks were fabricated by moving the sample at a speed of 25 μm/s with a continuous train of pulses of energy 0.35 μJ. The axial extent of the structure shown in Figs. 6(d1) and 6(d2) was approximately 4.5 μm, corresponding to fabrication from an objective lens with an effective NA of ≈ 0.5. If the correction was not applied and pulse energy raised to 1.4 μJ the structure shown in Figs. 6(d3) and 6(d4) was generated. There was a high degree of non-uniformity in the structure, with several parts missing. The axial extent of the features increased to 20 μm. Aberration correction was clearly still necessary for precise fabrication at this depth.

The larger susceptibility to aberration rendered parallelisation difficult compared to Section 4, since the aberration correction took up a larger proportion of the dynamic range on the SLM. Multi-point lattice structures analagous to those in Section 4, but with the lattice constant reduced to 6 μm, could be fabricated at a depth of 0.15 mm in the fused silica, as can be seen in Figs. 7(a) and 7(b). At depths greater than ∼ 300 μm the spherical aberration induced at the sample interface started to disrupt the formation of the focal array. Even by reducing the number of lattice points to 27 (a 3 × 3 × 3 array) to create a hologram with lower spatial frequency, the multi-foci fabrication only yielded a high degree of uniformity up to depths of ∼ 500 μm, Figs. 7(c) and 7(d). This problem could be possibly resolved by using a dual adaptive element laser fabrication system [29

29. R. D. Simmonds, P. S. Salter, A. Jesacher, and M. J. Booth, “Three dimensional laser microfabrication in diamond using a dual adaptive optics system,” Opt. Express 19, 24122–24128 (2011). [CrossRef] [PubMed]

], where an SLM is used for parallelisation while a membrane deformable mirror is used to correct for aberrations.

Fig. 7 Parallel multi-foci fabrication with a 0.75 NA objective and aberration correction. (a), (b) 196 voxels fabricated simultaneously at a depth of 150 μm. (c), (d) 27 voxels fabricated simultaneously at a depth of 500 μm. The pulses were incident in the z direction.

6. Conclusions

For deep (≳1 mm) laser machining in fused silica we have seen aberration correction to be essential, even at relatively low NA. For an objective lens with NA = 0.5, we have shown an SLM to be very effective at maintaining resolution and efficiency over a large depth range. There is sufficient dynamic range that the SLM can additionally provide significant parallelisation (196 separate foci) even at the working distance of the lens (2.4 mm). The single point resolution is maintained at ∼ 1 μm(laterally) × 5 μm (axially) across the full depth range. Without aberration correction, the fabricated features are significantly stretched along the axial direction, in part due to the focal distortion, but also as higher pulse energies are required, thus moving the fabrication into a self-focussing regime. Parallelisation is not possible for depths greater than a few hundred micrometres without aberration correction.

For higher resolution applications an objective with a higher NA is required and the aberration correction becomes even more critical. By applying aberration correction we were able to demonstrate single shot features with a 0.75 NA objective over a depth range of greater than 1 mm in fused silica, maintaining a resolution of ∼ 1 μm × 3 μm. It was still possible to fabricate in a controlled manner using aberration correction beyond this range but, the effective numerical aperture of the system was reduced. In such a case, it would be preferable to use a lower NA objective lens, where the aberrations are not so severe and resolution is maintained throughout the entire axial range of the fabricated structure.

Additionally we have presented a theoretical framework to describe the capabilities and limitations of SLM-based aberration correction, which ties in well with the experimental results. Through prior analysis of the SLM used in the experiment [25

25. P. S. Salter, Z. Iqbal, and M. J. Booth, “Analysis of the three-dimensional focal positioning capability of adaptive optic elements,” Int. J. Optomechatronics 7, 1–14 (2013). [CrossRef]

], it is possible to predict the range over which diffraction limited focus peformance through aberration correction can be expected. This can inform on the appropriate choice of objective lens for a particular application.

Acknowledgments

The authors gratefully acknowledge funding of the Erlangen Graduate School in Advanced Optical Technologies (SAOT) by the German Research Foundation (DFG) in the framework of the German excellence initiative. The authors (PS, MJB) also thank the Engineering and Physical Sciences Research Council ( EP/E055818/1, EP/K034480/1) and the Leverhulme Trust for additional financial support.

References and links

1.

R. R. Gattass and E. Mazur, “Femtosecond laser micromachining in transparent materials,” Nat. Photon. 2, 219–225 (2008). [CrossRef]

2.

K. M. Davis, K. Miura, N. Sugimoto, and K. Hirao, “Writing waveguides in glass with a femtosecond laser,” Opt. Lett. 21, 1729–1731 (1996). [CrossRef] [PubMed]

3.

H. Zhang, S. Eaton, and P. Herman, “Single-step writing of bragg grating waveguides in fused silica with an externally modulated femtosecond fiber laser,” Opt. Lett. 32, 2559–2561 (2007). [CrossRef] [PubMed]

4.

G. Della Valle, R. Osellame, and P. Laporta, “Micromachining of photonic devices by femtosecond laser pulses,” J. Opt. A: Pure Appl. Opt. 11, 013001 (2009). [CrossRef]

5.

R. R. Thomson, T. A. Birks, S. G. Leon-Saval, A. K. Kar, and J. Bland-Hawthorn, “Ultrafast laser inscription of an integrated photonic lantern,” Opt. Express 19, 5698–5705 (2011). [CrossRef] [PubMed]

6.

T. Meany, S. Gross, N. Jovanovic, A. Arriola, M. J. Steel, and M. J. Withford, “Towards low-loss lightwave circuits for non-classical optics at 800 and 1,550 nm,” Appl. Phys. A 114, 113–118 (2014). [CrossRef]

7.

F. He, H. Xu, Y. Cheng, J. Ni, H. Xiong, Z. Xu, K. Sugioka, and K. Midorikawa, “Fabrication of microfluidic channels with a circular cross section using spatiotemporally focused femtosecond laser pulses,” Opt. Lett. 35, 1106–1108 (2010). [CrossRef] [PubMed]

8.

F. Bragheri, P. Minzioni, R. M. Vazquez, N. Bellini, P. Paie, C. Mondello, R. Ramponi, I. Cristiani, and R. Osellame, “Optofluidic integrated cell sorter fabricated by femtosecond lasers,” Lab Chip 12, 3779–3784 (2012). [CrossRef] [PubMed]

9.

T. D. Gerke and R. Piestun, “Aperiodic volume optics,” Nat. Photon. 4, 188–193 (2010). [CrossRef]

10.

F. Zimmermann, S. Richter, S. Doring, A. Tunnermann, and S. Nolte, “Ultrastable bonding of glass with femtosecond laser bursts,” Appl. Opt. 52, 1149–1154 (2013). [CrossRef] [PubMed]

11.

B. Lenssen and Y. Bellouard, “Optically transparent glass micro-actuator fabricated by femtosecond laser exposure and chemical etching,” Appl. Phys. Lett. 101, 103503 (2012). [CrossRef]

12.

M. J. Booth, M. A. A. Neil, and T. Wilson, “Aberration correction for confocal imaging in refractive-index-mismatched media,” J. Microsc. 192, 90–98 (1998). [CrossRef]

13.

A. Marcinkevicius, V. Mizeikis, S. Juodkazis, S. Matsuo, and H. Misawa, “Effect of refractive index-mismatch on laser microfabrication in silica glass,” Appl. Phys. A 76, 257–260 (2003). [CrossRef]

14.

N. Huot, R. Stoian, A. Mermillod-Blondin, C. Mauclair, and E. Audouard, “Analysis of the effects of spherical aberration on ultrafast laser-induced refractive index variation in glass,” Opt. Express 15, 12395–12408 (2007). [CrossRef] [PubMed]

15.

V. Diez-Blanco, J. Siegel, A. Ferrer, A. R. de la Cruz, and J. Solis, “Deep subsurface waveguides with circular cross section produced by femtosecond laser writing,” Appl. Phys. Lett. 91, 051104 (2007). [CrossRef]

16.

C. Hnatovsky, R. S. Taylor, E. Simova, V. R. Bhardwaj, D. M. Rayner, and P. B. Corkum, “High-resolution study of photoinduced modification in fused silica produced by a tightly focused femtosecond laser beam in the presence of aberrations,” J. Appl. Phys. 98, 013517 (2005). [CrossRef]

17.

C. Mauclair, A. Mermillod-Blondin, S. Landon, N. Huot, A. Rosenfeld, I. V. Hertel, E. Audouard, I. Myiamoto, and R. Stoian, “Single pulse ultrafast laser imprinting of axial dot arrays in bulk glasses,” Opt. Lett. 36, 325–327 (2011). [CrossRef] [PubMed]

18.

B. P. Cumming, A. Jesacher, M. J. Booth, T. Wilson, and M. Gu, “Adaptive aberration compensation for three-dimensional micro-fabrication of photonic crystals in lithium niobate,” Opt. Express 19, 9419–9425 (2011). [CrossRef] [PubMed]

19.

E. H. Waller, M. Renner, and G. von Freymann, “Active aberration- and point-spread-function control in direct laser writing,” Opt. Express 20, 24949–24956 (2012). [CrossRef] [PubMed]

20.

A. Jesacher and M. J. Booth, “Parallel direct laser writing in three dimensions with spatially dependent aberration correction,” Opt. Express 18, 21090–21099 (2010). [CrossRef] [PubMed]

21.

C. Mauclair, A. Mermillod-Blondin, N. Huot, E. Audouard, and R. Stoian, “Ultrafast laser writing of homogeneous longitudinal waveguides in glasses using dynamic wavefront correction,” Opt. Express 16, 5481–5492 (2008). [CrossRef] [PubMed]

22.

P. S. Salter and M. J. Booth, “Focussing over the edge: adaptive subsurface laser fabrication up to the sample face,” Opt. Express 20, 19978–19989 (2012). [CrossRef] [PubMed]

23.

E. J. Botcherby, R. Juskaitis, M. J. Booth, and T. Wilson, “An optical technique for remote focusing in microscopy,” Opt. Commun. 281, 880–887 (2008). [CrossRef]

24.

B. P. Cumming, M. D. Turner, G. E. Schroder-Turk, S. Debbarma, B. Luther-Davies, and M. Gu, “Adaptive optics enhanced direct laser writing of high refractive index gyroid photonic crystals in chalcogenide glass,” Opt. Express 22, 689–698 (2014). [CrossRef] [PubMed]

25.

P. S. Salter, Z. Iqbal, and M. J. Booth, “Analysis of the three-dimensional focal positioning capability of adaptive optic elements,” Int. J. Optomechatronics 7, 1–14 (2013). [CrossRef]

26.

M. J. Booth, M. A. A. Neil, and T. Wilson, “New modal wave-front sensor: application to adaptive confocal fluorescence microscopy and two-photon excitation fluorescence microscopy,” J. Opt. Soc. Am. A 19, 2112–2120 (2002). [CrossRef]

27.

R. J. Beck, J. P. Parry, W. N. MacPherson, A. Waddie, N. J. Weston, J. D. Shephard, and D. P. Hand, “Application of cooled spatial light modulator for high power nanosecond laser micromachining,” Opt. Express 18, 17059–17065 (2010). [CrossRef] [PubMed]

28.

M. Born and E. Wolf, Principles of Optics, 4th ed. (Pergamon, 1970).

29.

R. D. Simmonds, P. S. Salter, A. Jesacher, and M. J. Booth, “Three dimensional laser microfabrication in diamond using a dual adaptive optics system,” Opt. Express 19, 24122–24128 (2011). [CrossRef] [PubMed]

30.

A. Jesacher, G. D. Marshall, T. Wilson, and M. J. Booth, “Adaptive optics for direct laser writing with plasma emission aberration sensing,” Opt. Express 18, 656–661 (2010). [CrossRef] [PubMed]

31.

P. Torok, P. Varga, Z. Laczik, and G. R. Booker, “Electromagnetic diffraction of light focused through a planar interface between materials of mismatched refractive indices: an integral representation,” J. Opt. Soc. Am. A 12, 325–332 (1995). [CrossRef]

32.

E. Toratani, M. Kamata, and M. Obara, “Self-fabrication of void array in fused silica by femtosecond laser processing,” Appl. Phys. Lett. 87, 171103 (2005). [CrossRef]

33.

K. Mishchik, G. Cheng, G. Huo, I. M. Burakov, C. Mauclair, A. Mermillod-Blondin, A. Rosenfeld, Y. Ouerdane, A. Boukenter, O. Parriaux, and R. Stoian, “Nanosize structural modifications with polarization functions in ultrafast laser irradiated bulk fused silica,” Opt. Express 18, 24809–24824 (2010). [CrossRef] [PubMed]

34.

L. Sudrie, A. Couairon, M. Franco, B. Lamouroux, B. Prade, S. Tzortzakis, and A. Mysyrowicz, “Femtosecond laser-induced damage and filamentary propagation in fused silica,” Phys. Rev. Lett. 89, 186601 (2002). [CrossRef] [PubMed]

OCIS Codes
(090.1000) Holography : Aberration compensation
(140.3390) Lasers and laser optics : Laser materials processing
(220.4000) Optical design and fabrication : Microstructure fabrication
(250.5300) Optoelectronics : Photonic integrated circuits
(130.2755) Integrated optics : Glass waveguides
(070.6120) Fourier optics and signal processing : Spatial light modulators

ToC Category:
Laser Microfabrication

History
Original Manuscript: April 10, 2014
Revised Manuscript: June 3, 2014
Manuscript Accepted: June 3, 2014
Published: July 14, 2014

Citation
P. S. Salter, M. Baum, I. Alexeev, M. Schmidt, and M. J. Booth, "Exploring the depth range for three-dimensional laser machining with aberration correction," Opt. Express 22, 17644-17656 (2014)
http://www.opticsinfobase.org/oe/abstract.cfm?URI=oe-22-15-17644


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References

  1. R. R. Gattass and E. Mazur, “Femtosecond laser micromachining in transparent materials,” Nat. Photon.2, 219–225 (2008). [CrossRef]
  2. K. M. Davis, K. Miura, N. Sugimoto, and K. Hirao, “Writing waveguides in glass with a femtosecond laser,” Opt. Lett.21, 1729–1731 (1996). [CrossRef] [PubMed]
  3. H. Zhang, S. Eaton, and P. Herman, “Single-step writing of bragg grating waveguides in fused silica with an externally modulated femtosecond fiber laser,” Opt. Lett.32, 2559–2561 (2007). [CrossRef] [PubMed]
  4. G. Della Valle, R. Osellame, and P. Laporta, “Micromachining of photonic devices by femtosecond laser pulses,” J. Opt. A: Pure Appl. Opt.11, 013001 (2009). [CrossRef]
  5. R. R. Thomson, T. A. Birks, S. G. Leon-Saval, A. K. Kar, and J. Bland-Hawthorn, “Ultrafast laser inscription of an integrated photonic lantern,” Opt. Express19, 5698–5705 (2011). [CrossRef] [PubMed]
  6. T. Meany, S. Gross, N. Jovanovic, A. Arriola, M. J. Steel, and M. J. Withford, “Towards low-loss lightwave circuits for non-classical optics at 800 and 1,550 nm,” Appl. Phys. A114, 113–118 (2014). [CrossRef]
  7. F. He, H. Xu, Y. Cheng, J. Ni, H. Xiong, Z. Xu, K. Sugioka, and K. Midorikawa, “Fabrication of microfluidic channels with a circular cross section using spatiotemporally focused femtosecond laser pulses,” Opt. Lett.35, 1106–1108 (2010). [CrossRef] [PubMed]
  8. F. Bragheri, P. Minzioni, R. M. Vazquez, N. Bellini, P. Paie, C. Mondello, R. Ramponi, I. Cristiani, and R. Osellame, “Optofluidic integrated cell sorter fabricated by femtosecond lasers,” Lab Chip12, 3779–3784 (2012). [CrossRef] [PubMed]
  9. T. D. Gerke and R. Piestun, “Aperiodic volume optics,” Nat. Photon.4, 188–193 (2010). [CrossRef]
  10. F. Zimmermann, S. Richter, S. Doring, A. Tunnermann, and S. Nolte, “Ultrastable bonding of glass with femtosecond laser bursts,” Appl. Opt.52, 1149–1154 (2013). [CrossRef] [PubMed]
  11. B. Lenssen and Y. Bellouard, “Optically transparent glass micro-actuator fabricated by femtosecond laser exposure and chemical etching,” Appl. Phys. Lett.101, 103503 (2012). [CrossRef]
  12. M. J. Booth, M. A. A. Neil, and T. Wilson, “Aberration correction for confocal imaging in refractive-index-mismatched media,” J. Microsc.192, 90–98 (1998). [CrossRef]
  13. A. Marcinkevicius, V. Mizeikis, S. Juodkazis, S. Matsuo, and H. Misawa, “Effect of refractive index-mismatch on laser microfabrication in silica glass,” Appl. Phys. A76, 257–260 (2003). [CrossRef]
  14. N. Huot, R. Stoian, A. Mermillod-Blondin, C. Mauclair, and E. Audouard, “Analysis of the effects of spherical aberration on ultrafast laser-induced refractive index variation in glass,” Opt. Express15, 12395–12408 (2007). [CrossRef] [PubMed]
  15. V. Diez-Blanco, J. Siegel, A. Ferrer, A. R. de la Cruz, and J. Solis, “Deep subsurface waveguides with circular cross section produced by femtosecond laser writing,” Appl. Phys. Lett.91, 051104 (2007). [CrossRef]
  16. C. Hnatovsky, R. S. Taylor, E. Simova, V. R. Bhardwaj, D. M. Rayner, and P. B. Corkum, “High-resolution study of photoinduced modification in fused silica produced by a tightly focused femtosecond laser beam in the presence of aberrations,” J. Appl. Phys.98, 013517 (2005). [CrossRef]
  17. C. Mauclair, A. Mermillod-Blondin, S. Landon, N. Huot, A. Rosenfeld, I. V. Hertel, E. Audouard, I. Myiamoto, and R. Stoian, “Single pulse ultrafast laser imprinting of axial dot arrays in bulk glasses,” Opt. Lett.36, 325–327 (2011). [CrossRef] [PubMed]
  18. B. P. Cumming, A. Jesacher, M. J. Booth, T. Wilson, and M. Gu, “Adaptive aberration compensation for three-dimensional micro-fabrication of photonic crystals in lithium niobate,” Opt. Express19, 9419–9425 (2011). [CrossRef] [PubMed]
  19. E. H. Waller, M. Renner, and G. von Freymann, “Active aberration- and point-spread-function control in direct laser writing,” Opt. Express20, 24949–24956 (2012). [CrossRef] [PubMed]
  20. A. Jesacher and M. J. Booth, “Parallel direct laser writing in three dimensions with spatially dependent aberration correction,” Opt. Express18, 21090–21099 (2010). [CrossRef] [PubMed]
  21. C. Mauclair, A. Mermillod-Blondin, N. Huot, E. Audouard, and R. Stoian, “Ultrafast laser writing of homogeneous longitudinal waveguides in glasses using dynamic wavefront correction,” Opt. Express16, 5481–5492 (2008). [CrossRef] [PubMed]
  22. P. S. Salter and M. J. Booth, “Focussing over the edge: adaptive subsurface laser fabrication up to the sample face,” Opt. Express20, 19978–19989 (2012). [CrossRef] [PubMed]
  23. E. J. Botcherby, R. Juskaitis, M. J. Booth, and T. Wilson, “An optical technique for remote focusing in microscopy,” Opt. Commun.281, 880–887 (2008). [CrossRef]
  24. B. P. Cumming, M. D. Turner, G. E. Schroder-Turk, S. Debbarma, B. Luther-Davies, and M. Gu, “Adaptive optics enhanced direct laser writing of high refractive index gyroid photonic crystals in chalcogenide glass,” Opt. Express22, 689–698 (2014). [CrossRef] [PubMed]
  25. P. S. Salter, Z. Iqbal, and M. J. Booth, “Analysis of the three-dimensional focal positioning capability of adaptive optic elements,” Int. J. Optomechatronics7, 1–14 (2013). [CrossRef]
  26. M. J. Booth, M. A. A. Neil, and T. Wilson, “New modal wave-front sensor: application to adaptive confocal fluorescence microscopy and two-photon excitation fluorescence microscopy,” J. Opt. Soc. Am. A19, 2112–2120 (2002). [CrossRef]
  27. R. J. Beck, J. P. Parry, W. N. MacPherson, A. Waddie, N. J. Weston, J. D. Shephard, and D. P. Hand, “Application of cooled spatial light modulator for high power nanosecond laser micromachining,” Opt. Express18, 17059–17065 (2010). [CrossRef] [PubMed]
  28. M. Born and E. Wolf, Principles of Optics, 4th ed. (Pergamon, 1970).
  29. R. D. Simmonds, P. S. Salter, A. Jesacher, and M. J. Booth, “Three dimensional laser microfabrication in diamond using a dual adaptive optics system,” Opt. Express19, 24122–24128 (2011). [CrossRef] [PubMed]
  30. A. Jesacher, G. D. Marshall, T. Wilson, and M. J. Booth, “Adaptive optics for direct laser writing with plasma emission aberration sensing,” Opt. Express18, 656–661 (2010). [CrossRef] [PubMed]
  31. P. Torok, P. Varga, Z. Laczik, and G. R. Booker, “Electromagnetic diffraction of light focused through a planar interface between materials of mismatched refractive indices: an integral representation,” J. Opt. Soc. Am. A12, 325–332 (1995). [CrossRef]
  32. E. Toratani, M. Kamata, and M. Obara, “Self-fabrication of void array in fused silica by femtosecond laser processing,” Appl. Phys. Lett.87, 171103 (2005). [CrossRef]
  33. K. Mishchik, G. Cheng, G. Huo, I. M. Burakov, C. Mauclair, A. Mermillod-Blondin, A. Rosenfeld, Y. Ouerdane, A. Boukenter, O. Parriaux, and R. Stoian, “Nanosize structural modifications with polarization functions in ultrafast laser irradiated bulk fused silica,” Opt. Express18, 24809–24824 (2010). [CrossRef] [PubMed]
  34. L. Sudrie, A. Couairon, M. Franco, B. Lamouroux, B. Prade, S. Tzortzakis, and A. Mysyrowicz, “Femtosecond laser-induced damage and filamentary propagation in fused silica,” Phys. Rev. Lett.89, 186601 (2002). [CrossRef] [PubMed]

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