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Optics Express

Optics Express

  • Editor: C. Martijn de Sterke
  • Vol. 17, Iss. 26 — Dec. 21, 2009
  • pp: 24342–24348
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Multi-mode mitigation in an optofluidic chip for particle manipulation and sensing

Philip Measor, Sergei Kühn, Evan J. Lunt, Brian S. Phillips, Aaron R. Hawkins, and Holger Schmidt  »View Author Affiliations


Optics Express, Vol. 17, Issue 26, pp. 24342-24348 (2009)
http://dx.doi.org/10.1364/OE.17.024342


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Abstract

A new waveguide design for an optofluidic chip is presented. It mitigates multi-mode behavior in solid and liquid-core waveguides by increasing fundamental mode coupling to 82% and 95%, respectively. Additionally, we demonstrate a six-fold improvement in lateral confinement of optically guided dielectric microparticles and double the detection efficiency of fluorescent particles.

© 2009 OSA

Introduction

First generation optofluidic platform

The optofluidic ARROW platforms used in this study consisted of specifically designed dielectric layers (three periods of SiN and SiO2) providing optical isolation from the high index Si substrate. Layers surrounding a hollow core (LC, H2O filled) are deposited (three periods of SiN and SiO2) for low optical loss in a liquid core [4

4. H. Schmidt and A. Hawkins, “Optofluidic waveguides: I. Concepts and implementations,” Microfluidics and Nanofluidics 4(1-2), 3–16 (2008). [CrossRef] [PubMed]

,5

5. A. Hawkins and H. Schmidt, “Optofluidic waveguides: II. Fabrication and structures,” Microfluidics and Nanofluidics 4(1-2), 17–32 (2008). [CrossRef]

], and provide a microfluidic channel terminated by reservoirs (R). Ridge-type solid-core ARROWs (SC) are used for optical interfacing to single-mode fibers (SMF) and to define intersections (iSC) (Fig. 1
Fig. 1 (a) Top down schematic of an ARROW optofluidic platform with ridge-type solid-core ARROWs (SC), intersecting SC (iSC), liquid-core ARROWs (LC), and attached reservoirs (R). (b) Single-mode fiber (SMF), SC, to LC coupling scheme defining the SMF core width, wSMF, SC width, wSC, LC width, wLC, and device facet input coupling coefficient, κi.
). In this geometry, light may be used for optical manipulation (Pt), excitation of particles at the intersection (Pex), and detection of particle fluorescence collected by the liquid-core waveguide (Pem).

As an example of the sensing capability in the ARROW platform, a solid and liquid-core waveguide width, wSC and wLC respectively, of 12μm was previously used to show single-particle sensitivity [7

7. D. Yin, E. J. Lunt, M. I. Rudenko, D. W. Deamer, A. R. Hawkins, and H. Schmidt, “Planar optofluidic chip for single particle detection, manipulation, and analysis,” Lab Chip 7(9), 1171–1175 (2007). [CrossRef] [PubMed]

]. However, multiple modes are still excited in the solid-core ARROW with wSC>wSMF [Fig. 1(b), typically wSC = 12μm and wSMF = 4μm], since there exists a significant overlap of the SMF TEM00 mode with the SC fundamental and higher order modes. The waveguide power input coupling coefficients for the SMF (mode 1) to SC (mode i) is defined as κi (for i = 1,2,3...). Since wSC = wLC, the fraction of power coupled to each mode from the solid-core to the liquid-core sections is approximately equal, but power loss can occur by fabrication-limited imperfections of the interface [13

13. E. J. Lunt, P. Measor, B. S. Phillips, S. Kühn, H. Schmidt, and A. R. Hawkins, “Improving solid to hollow core transmission for integrated ARROW waveguides,” Opt. Express 16(25), 20981–20986 (2008). [CrossRef] [PubMed]

]. The theoretical coupling coefficients reported throughout this paper were obtained using a commercial 2D finite element mode solver (FIMMWAVE, ©Photon Design). To measure the liquid core waveguide coupling, the x-z mode profile was obtained by filling the liquid core with aqueous fluorescent dye (rhodamine 6G, 1μM, in ultrapure water, 18MΩ-cm) and excited with frequency doubled Nd:YAG laser light (532 nm) via the SMF. The waveguide multimode beat pattern in the liquid core was observed with a charge-coupled device camera from above where the adjacent images are stitched together and normalized to reveal the long range trend [Fig. 2(a)
Fig. 2 First generation device liquid-core waveguide intensity pattern for (a) experimental measurement and (b) corresponding simulation.
]. The result shows excellent agreement with the corresponding simulated intensity profile [Fig. 2(b)] for wSMF = 4μm, wSC = wLC = 12μm, and LSC = 3.1mm with a beat length of ΔL = 2π/Δβ≈359μm (Δβ = β31 where βi is the ith mode propagation constant) and coupling coefficients of κ1 = 0.88, κ2 = 0.02, and κ3 = 0.08.

Therefore, Fig. 2 reveals that even moderate coupling into higher-order modes in a liquid-core waveguide results in significant mode interference. To increase fundamental mode coupling, the solid-core waveguide parameters need to be optimized.

Second generation optofluidic platform

Typically, solid-core ARROW loss is limited by light scattering from the rough waveguide walls. As wSC decreases or the mode order increases, the wall-field interaction is enhanced and the waveguide loss increases. Despite the larger waveguide loss, α, for narrow waveguides, the total device transmittance, T, may still increase for shorter lengths if κ1 is large. Assuming Twide,narrow = κwide,narrowexp(-αwide,narrowLSC), the length at which a wide waveguide has higher transmittance than a narrow waveguide is given by,
Ld=(Δα)1ln(κ1),
(1)
where Δα is the waveguide loss difference of the wide and narrow waveguide and κ is the ratio of coupling coefficients of the wide to narrow waveguide.

The simulated fundamental mode coupling from SMF to the solid-core waveguide as a function of wSC is shown on Fig. 3(a)
Fig. 3 Solid-core ARROW (a) fundamental mode coupling, κ1, as a function of waveguide width, wSC and (b) transmittance, T, as a function of waveguide length, LSC.
(wSMF = 4μm), where a maximum at wSC = 4μm is obtained. Solid-core waveguides with wSC = 4μm were fabricated and the transmission as a function of solid-core length, LSC, was measured [Fig. 3(b)]. A line was fitted to ln(T)=ln(κ1κo)αSCLSC to extract solid-core waveguide loss, αSC, and κ1κo, where κo is the solid-core waveguide output loss coefficient [Fig. 3(b)]. Assuming κo~0.96, due to the finite reflectance of the output facet, the measured fundamental mode input coupling efficiency is κ1 = 0.82.

Compared to the first generation platform with standard liquid-core ARROWs [13

13. E. J. Lunt, P. Measor, B. S. Phillips, S. Kühn, H. Schmidt, and A. R. Hawkins, “Improving solid to hollow core transmission for integrated ARROW waveguides,” Opt. Express 16(25), 20981–20986 (2008). [CrossRef] [PubMed]

], the factor of 3 size reduction increased κ1 and αSC by a factor of 1.4 and 2.7, respectively. It can be seen that the measured κ1 is lower than ideal, where the deviation is attributed to imperfect facets and alignment. Therefore, the LSC needs to be no further than Ld~3mm (wSC = 4μm) from the chip facet to yield a higher total transmittance. As in the first generation device, high solid to liquid-core waveguide coupling can be achieved by fabricating a device with wLC = wSC. However, αLCwLC3 [14

14. J.-L. Archambault, R. Black, S. Lacroix, and J. Bures, “Loss calculations for antiresonant waveguides,” J. Lightwave Technol. 11(3), 416–423 (1993). [CrossRef]

], and thus a wLC from 12 to 4μm will increase αLC by a factor of 33.

One method to allow low αLC and high κ1, is to introduce a lateral taper [15

15. D. Marcuse, “Radiation losses of step-tapered channel waveguides,” Appl. Opt. 19(21), 3676–3681 (1980). [CrossRef] [PubMed]

,16

16. R. N. Thurston, E. Kapon, and A. Shahar, “Two-dimensional control of mode size in optical channel waveguides by lateral channel tapering,” Opt. Lett. 16(5), 306–308 (1991). [CrossRef] [PubMed]

]. This has the advantage of simultaneously achieving high κ1 with a narrow ARROW and the low loss of the wide ARROW. The solid-core waveguide taper starts with the optimized wSC = 4μm and gradually increases over a length, Lt, to wLC thus matching the solid to liquid-core waveguide coupling perfectly (Fig. 4
Fig. 4 Representation of the single-mode fiber (SMF) and solid-core ARROW (SC) interface coupling coefficient κf for SC width wSC, SC taper over length Lt, and liquid-core ARROW (LC) coupling, κj for LC width wLC.
).

As Lt→∞ the solid-core waveguide fundamental mode (mode 1) to liquid-core waveguide mode j = 1,2,3… coupling efficiency, κj, will tend toward unity [Fig. 4, 5(a)
Fig. 5 Tapered solid-core ARROW (a) fundamental mode coupling coefficient, κ1, and taper length, Lt, dependence; (b) κ1 wavelength, λ, dependence for Lt = 550μm; and (c) fabricated device for wSC = 4μm, wLC = 12μm, and Lt = 550μm.
]. However, considering waveguide loss and device fabrication, a finite taper length of Lt = 550μm yields an optimal coupling of κ1>0.99 [Fig. 5(a)].

Figure 5(b) gives the wavelength dependence of κ1 (Lt = 550μm) and shows the expected weak wavelength dependence allowing broadband operation. Figure 5(c) shows a section of the fabricated device with wSC = 4μm, wLC = 12μm, and Lt = 550μm. The second generation devices were standard liquid-core ARROWs and obtained (Fig. 6
Fig. 6 Second generation device liquid-core ARROW intensity pattern for (a) experimental measurement and (b) corresponding simulation.
) using the same method as Fig. 2(a).

As can be seen in Fig. 6(a), the optimized device has virtually no intensity beating and again shows excellent agreement with simulations [Fig. 6(b)] for wSMF = wSC = 4μm, wLC = 12μm, and LSC = 2.8μm with κ1 = 0.95, κ2 = 0.01, and κ3 = 0.00. Therefore, the taper design successfully eliminates higher-order mode coupling.

Optical manipulation and sensing experiments

Now that the device supports a single mode, it can be used to center a particle in the waveguide channel via a guiding beam—a beam of light that uses the gradient force of radiation pressure to confine particles at the highest intensity [17

17. A. Ashkin, “Acceleration and trapping of particles by radiation pressure,” Phys. Rev. Lett. 24(4), 156–159 (1970). [CrossRef]

]. Particle centering improves the fluorescence detection efficiency, since the overlap of the waveguide mode and fluorescent dipole emission profile is highest [6

6. D. Yin, J. P. Barber, A. R. Hawkins, and H. Schmidt, “Highly efficient fluorescence detection in picoliter volume liquid-core waveguides,” Appl. Phys. Lett. 87(21), 211111 (2005). [CrossRef]

]. To demonstrate improved particle confinement, microspheres were introduced into the liquid core and manipulated with the guiding beam along z similar to [8

8. P. Measor, S. Kühn, E. J. Lunt, B. S. Phillips, A. R. Hawkins, and H. Schmidt, “Hollow-core waveguide characterization by optically induced particle transport,” Opt. Lett. 33(7), 672–674 (2008). [CrossRef] [PubMed]

]. First, the hollow-core waveguide was filled with ultra-pure water (18MΩ-cm) in one reservoir. Next, a suspension of 2μm diameter polystyrene particles (n~1.59 index at 532nm, Spherotech), ultra-pure water, and Triton X (0.03%) was introduced into the liquid core (0.4 particles/nL), via the opposite reservoir. A particle was then brought into the liquid core using pressure-induced flow. Once a microparticle is in the waveguide region, residual particle drift was balanced such that only Brownian motion was observed. Finally, the guiding beam was provided by a near infrared (NIR, λ = 820nm) beam coupled to the liquid-core waveguide via the taper (Pt~10-25mW). The microparticle trajectory (x-z) and lateral distribution, p(x), are shown in Fig. 7(a)
Fig. 7 (a) Particle trajectory in a liquid-core ARROW (left) and lateral position distribution, p(x), (right) with NIR beam guiding of a microparticle. The collected particle fluorescence with a guiding beam (b) off and (c) on.
for a particle under NIR irradiance (Pt~10mW).

As can be seen, the particle trajectory [Fig. 7(a)] is strongly confined to the center of the waveguide (x = 5.98 ± 0.23μm). This is a 6.2-fold improvement in the lateral standard deviation from the waveguide center over the first generation device [8

8. P. Measor, S. Kühn, E. J. Lunt, B. S. Phillips, A. R. Hawkins, and H. Schmidt, “Hollow-core waveguide characterization by optically induced particle transport,” Opt. Lett. 33(7), 672–674 (2008). [CrossRef] [PubMed]

].

To detect a particle, we required a signal-to-noise ratio of 1:1 with respect to the background. The ratio of the number of detected particles to the number of particles that pass the intersection defines the detection efficiency, η. With a guiding beam, η increases from 41% to 85%. The undetected particles, with a guiding beam, are attributed to the confinement in the y-direction. Therefore, a single-mode guiding beam can be used to substantially increase the detection efficiency of a particle as it flows through an optofluidic channel.

Summary and conclusions

In summary, we have developed a new waveguide design for an ARROW-based optofluidic detection platform to improve optical interconnectivity and predictable field distribution. Fundamental mode operation was achieved despite the different working waveguide widths. This improvement was shown not only to benefit low-loss propagation but also for optical particle manipulation and detection. Specifically, the design resulted in a more than six-fold tighter microparticle lateral confinement and doubled the particle detection efficiency in fluorescence measurements. As a result, this device enables excellent all-optical particle manipulation control of fluorescence collection on an integrated optofluidic chip. Additionally, the platform enables future interferometric or optical manipulation devices that exploit the predictable mode profile and may be extended to tailor the field distribution at different points along the waveguide.

Acknowledgments

This work was supported by the NIH/NIBIB (R01EB006097, NIH-ARRA 1R21ER008802), NSF (ECS-0528730, ECS-0528714), and the W.M. Keck Center for Nanoscale Optofluidics at the University of California at Santa Cruz.

References and links

1.

D. Psaltis, S. R. Quake, and C. Yang, “Developing optofluidic technology through the fusion of microfluidics and optics,” Nature 442(7101), 381–386 (2006). [CrossRef] [PubMed]

2.

C. Monat, P. Domachuk, and B. Eggleton, “Integrated optofluidics: A new river of light,” Nat. Photonics 1(2), 106–114 (2007). [CrossRef]

3.

R. Bernini, S. Campopiano, L. Zeni, and P. M. Sarro, “ARROW optical waveguide based sensors,” Sens. Actuators B Chem. 100(1-2), 143–146 (2004). [CrossRef]

4.

H. Schmidt and A. Hawkins, “Optofluidic waveguides: I. Concepts and implementations,” Microfluidics and Nanofluidics 4(1-2), 3–16 (2008). [CrossRef] [PubMed]

5.

A. Hawkins and H. Schmidt, “Optofluidic waveguides: II. Fabrication and structures,” Microfluidics and Nanofluidics 4(1-2), 17–32 (2008). [CrossRef]

6.

D. Yin, J. P. Barber, A. R. Hawkins, and H. Schmidt, “Highly efficient fluorescence detection in picoliter volume liquid-core waveguides,” Appl. Phys. Lett. 87(21), 211111 (2005). [CrossRef]

7.

D. Yin, E. J. Lunt, M. I. Rudenko, D. W. Deamer, A. R. Hawkins, and H. Schmidt, “Planar optofluidic chip for single particle detection, manipulation, and analysis,” Lab Chip 7(9), 1171–1175 (2007). [CrossRef] [PubMed]

8.

P. Measor, S. Kühn, E. J. Lunt, B. S. Phillips, A. R. Hawkins, and H. Schmidt, “Hollow-core waveguide characterization by optically induced particle transport,” Opt. Lett. 33(7), 672–674 (2008). [CrossRef] [PubMed]

9.

M. I. Rudenko, S. Kühn, E. J. Lunt, D. W. Deamer, A. R. Hawkins, and H. Schmidt, “Ultrasensitive Qbeta phage analysis using fluorescence correlation spectroscopy on an optofluidic chip,” Biosens. Bioelectron. 24(11), 3258–3263 (2009). [CrossRef] [PubMed]

10.

S. Kühn, P. Measor, E. J. Lunt, B. S. Phillips, D. W. Deamer, A. R. Hawkins, and H. Schmidt, “Loss-based optical trap for on-chip particle analysis,” Lab Chip 9(15), 2212–2216 (2009). [CrossRef] [PubMed]

11.

A. W. Snyder, and J. D. Love, Optical Waveguide Theory (Springer, 1983).

12.

R. Bernini, G. Testa, L. Zeni, and P. M. Sarro, “Integrated optofluidic Mach-Zehnder interferometer based on liquid core waveguides,” Appl. Phys. Lett. 93(1), 011106 (2008). [CrossRef]

13.

E. J. Lunt, P. Measor, B. S. Phillips, S. Kühn, H. Schmidt, and A. R. Hawkins, “Improving solid to hollow core transmission for integrated ARROW waveguides,” Opt. Express 16(25), 20981–20986 (2008). [CrossRef] [PubMed]

14.

J.-L. Archambault, R. Black, S. Lacroix, and J. Bures, “Loss calculations for antiresonant waveguides,” J. Lightwave Technol. 11(3), 416–423 (1993). [CrossRef]

15.

D. Marcuse, “Radiation losses of step-tapered channel waveguides,” Appl. Opt. 19(21), 3676–3681 (1980). [CrossRef] [PubMed]

16.

R. N. Thurston, E. Kapon, and A. Shahar, “Two-dimensional control of mode size in optical channel waveguides by lateral channel tapering,” Opt. Lett. 16(5), 306–308 (1991). [CrossRef] [PubMed]

17.

A. Ashkin, “Acceleration and trapping of particles by radiation pressure,” Phys. Rev. Lett. 24(4), 156–159 (1970). [CrossRef]

OCIS Codes
(220.2740) Optical design and fabrication : Geometric optical design
(230.1150) Optical devices : All-optical devices
(230.7370) Optical devices : Waveguides
(280.4788) Remote sensing and sensors : Optical sensing and sensors
(350.4855) Other areas of optics : Optical tweezers or optical manipulation
(310.6845) Thin films : Thin film devices and applications

ToC Category:
Optical Trapping and Manipulation

History
Original Manuscript: November 23, 2009
Manuscript Accepted: December 9, 2009
Published: December 18, 2009

Virtual Issues
Vol. 5, Iss. 1 Virtual Journal for Biomedical Optics

Citation
Philip Measor, Sergei Kühn, Evan J. Lunt, Brian S. Phillips, Aaron R. Hawkins, and Holger Schmidt, "Multi-mode mitigation in an optofluidic chip for particle manipulation and sensing," Opt. Express 17, 24342-24348 (2009)
http://www.opticsinfobase.org/oe/abstract.cfm?URI=oe-17-26-24342


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References

  1. D. Psaltis, S. R. Quake, and C. Yang, “Developing optofluidic technology through the fusion of microfluidics and optics,” Nature 442(7101), 381–386 (2006). [CrossRef] [PubMed]
  2. C. Monat, P. Domachuk, and B. Eggleton, “Integrated optofluidics: A new river of light,” Nat. Photonics 1(2), 106–114 (2007). [CrossRef]
  3. R. Bernini, S. Campopiano, L. Zeni, and P. M. Sarro, “ARROW optical waveguide based sensors,” Sens. Actuators B Chem. 100(1-2), 143–146 (2004). [CrossRef]
  4. H. Schmidt and A. Hawkins, “Optofluidic waveguides: I. Concepts and implementations,” Microfluidics and Nanofluidics 4(1-2), 3–16 (2008). [CrossRef] [PubMed]
  5. A. Hawkins and H. Schmidt, “Optofluidic waveguides: II. Fabrication and structures,” Microfluidics and Nanofluidics 4(1-2), 17–32 (2008). [CrossRef]
  6. D. Yin, J. P. Barber, A. R. Hawkins, and H. Schmidt, “Highly efficient fluorescence detection in picoliter volume liquid-core waveguides,” Appl. Phys. Lett. 87(21), 211111 (2005). [CrossRef]
  7. D. Yin, E. J. Lunt, M. I. Rudenko, D. W. Deamer, A. R. Hawkins, and H. Schmidt, “Planar optofluidic chip for single particle detection, manipulation, and analysis,” Lab Chip 7(9), 1171–1175 (2007). [CrossRef] [PubMed]
  8. P. Measor, S. Kühn, E. J. Lunt, B. S. Phillips, A. R. Hawkins, and H. Schmidt, “Hollow-core waveguide characterization by optically induced particle transport,” Opt. Lett. 33(7), 672–674 (2008). [CrossRef] [PubMed]
  9. M. I. Rudenko, S. Kühn, E. J. Lunt, D. W. Deamer, A. R. Hawkins, and H. Schmidt, “Ultrasensitive Qbeta phage analysis using fluorescence correlation spectroscopy on an optofluidic chip,” Biosens. Bioelectron. 24(11), 3258–3263 (2009). [CrossRef] [PubMed]
  10. S. Kühn, P. Measor, E. J. Lunt, B. S. Phillips, D. W. Deamer, A. R. Hawkins, and H. Schmidt, “Loss-based optical trap for on-chip particle analysis,” Lab Chip 9(15), 2212–2216 (2009). [CrossRef] [PubMed]
  11. A. W. Snyder, and J. D. Love, Optical Waveguide Theory (Springer, 1983).
  12. R. Bernini, G. Testa, L. Zeni, and P. M. Sarro, “Integrated optofluidic Mach-Zehnder interferometer based on liquid core waveguides,” Appl. Phys. Lett. 93(1), 011106 (2008). [CrossRef]
  13. E. J. Lunt, P. Measor, B. S. Phillips, S. Kühn, H. Schmidt, and A. R. Hawkins, “Improving solid to hollow core transmission for integrated ARROW waveguides,” Opt. Express 16(25), 20981–20986 (2008). [CrossRef] [PubMed]
  14. J.-L. Archambault, R. Black, S. Lacroix, and J. Bures, “Loss calculations for antiresonant waveguides,” J. Lightwave Technol. 11(3), 416–423 (1993). [CrossRef]
  15. D. Marcuse, “Radiation losses of step-tapered channel waveguides,” Appl. Opt. 19(21), 3676–3681 (1980). [CrossRef] [PubMed]
  16. R. N. Thurston, E. Kapon, and A. Shahar, “Two-dimensional control of mode size in optical channel waveguides by lateral channel tapering,” Opt. Lett. 16(5), 306–308 (1991). [CrossRef] [PubMed]
  17. A. Ashkin, “Acceleration and trapping of particles by radiation pressure,” Phys. Rev. Lett. 24(4), 156–159 (1970). [CrossRef]

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