I. INTRODUCTION
Many studies have been conducted on dielectric guided-mode resonance (GMR) filters [1], and various practical applications have been suggested such as narrow-line feedback elements [2], biosensors [3], tunable optical filters [4], dispersion engineering [5], polarization beam splitters [6, 7], high power microwave frequency selective elements [8], and color filters [9-12].
Meanwhile, a lot of attention has been given to various types of plasmon-assisted filters after the subwavelength transmission effect through metal holes, which is known as extraordinary transmission, was reported [13-17]. Various types of plasmonic color filters have been proposed, investigated, and demonstrated, with suggestions put forward regarding their application areas [18-27].
A GMR filter can be utilized by plasmons to manipulate light and provide additional functionalities. Recently, metal-insulator- metal (MIM) structures have been employed as a wave-guiding element for GMR filters, and visible wavelength color filters have been realized [28]. Compared to the general dielectric-based GMR filter, the GMR filter employing MIM structures in [28] is more compact and has the embedded functionality of a polarizer, which is advantageous for applications in liquid crystal displays (LCDs) by eliminating the need for a separate polarizer layer. Though it is suitable for the aforementioned application (i.e., in LCDs), it is restricted to applications involving single polarization due the other polarizations being blocked.
To make the best use of the light-manipulation ability of the MIM-type GMR structure, attention must be paid to the fact that the MIM waveguide can support a polarization-selective mode in accordance with the excited plasmon mode at the edge of the metal. This study aims to achieve GMR in both x- and y-polarizations instead of blocking one of the polarizations. Independent color filtering of differently polarized light is possible with a rectangular MIM grating by exciting GMR in both polarizations with the appropriate selection and variation of the material and geometric parameters.
A numerical simulation was performed for the independent color filtering of differently polarized light with the proposed rectangular MIM grating. Independent color filters such as red/green/blue filters for both x-polarization and y-polarization have been demonstrated as examples and their practical application was discussed.
II. DESIGN CONSIDERATIONS
Figure 1 shows a functional description of the proposed independent color filtering of differently polarized light. The proposed structure can work as a red color filter for x-polarized light and a blue color filter for y-polarized light. If unpolarized white light is incident on the proposed structure, red and blue light can be transmitted for x- and y-polarization, respectively.
FIG. 1.Functional description of proposed independent color filtering of differently polarized light.
A detailed geometric structure is shown in Fig. 2. Where sx, sy are the slit widths along the x and y axes; gx, gy are the grating widths along the x and y axes; TI, Tm are the thicknesses of the insulator and metal, respectively. Metal/insulator/metal layers are stacked on the substrate as a MIM waveguide and patterned in a rectangle shape, as shown in the figure.
FIG. 2.Geometry of proposed MIM-type GMR structure in which the filtering wavelength of each polarization can be independently established.
The operation principle of the proposed structure is the same as that in [28] except for the diffraction dimension. The proposed structure uses a rectangular-shaped two-dimensional grating while the reference study uses a line-shaped one-dimensional grating. Hence, the proposed structure can support both directions of polarization. However, it is noteworthy that some design considerations must be taken into account to enable GMR in both directions while avoiding interference between the polarizations.
One of the most important considerations is reducing the amount of uncoupled transmission that follows an unintended path without waveguide coupling. The amount of uncoupled transmission is associated with the width of the slit (sx, sy) that light can pass through without coupling. Even though narrow slit widths are required to reduce out-coupling, they generally result in reduced transmittance due to the reduced occupation of opening area when the grating width (gx, gy) is nearly constant to ensure the same GMR wavelength condition. An effective means to maintain the duty cycle when reducing the slit width is reducing the grating width (gx, gy) while ensuring the same GMR wavelength conditions by increasing the refractive index of the waveguide.
The filtering wavelength of x- and y-polarization is determined by the phase-matching condition of Eqs. (1) and (2), respectively.
where k0 is the propagation constant in free space and kMIN is the propagation constant of the MIM waveguide, which can be calculated using Eq. (3) as follows:
where εI and εm are the relative permittivities of the insulator and metal (Al), respectively, and tI is the thickness of the insulator shown in Fig. 2.
III. SIMULATION AND DISCUSSION
The filtering wavelength can be estimated using the GMR phase-matching condition of Eqs. (1) and (2), but the slit width is uncertain. The slit width must be large enough to ensure a sufficient amount of light transmission. However, it should not be too wide because it may weaken the waveguide coupling. To ensure a large transmittance of the filter, the occupation of opening area of the grating must be large without weakening the waveguide coupling by adjusting the refractive index of the insulator of the MIM waveguide. If the refractive index of the insulator is increased, the wave number increases and the grating width can be reduced for the same phase-matching condition. This results in a large occupation of opening area so that the light blocked by the metal can be reduced.
A large slit width also has a negative effect on the spectrum of the other polarizations. To see the influence of the slit width along the y-axis of the filtering spectrum of the x-polarization, a numerical simulation was performed at fixed x-axis parameters while detuning the slit width along the y-axis with a fixed period. Commercial software, COMSOL, was used to solve the electromagnetic wave equation using the finite element method. The simulation parameters for the study are summarized in Table 1. Aluminum was used as the metal layer, and the variation in its refractive index with wavelength is plotted in Fig. 3 [29]. The periodic boundary conditions were set along x- and y-axis directions and the simulation space was meshed symmetrically about both the x- and y-axis to assure accuracy of the calculation. Rectangular-shaped mesh size less than 20 nm was used.
TABLE 1.Simulation parameters for calculation
FIG. 3.Refractive index of aluminum used as simulation parameter [29].
To observe transmittance and bandwidth affected by the refractive index of insulator square shape grating filters were simulated for fixed slit width of sx = sy = 50 nm with the different refractive index at fixed phase matching condition. Grating widths of gx = gy = 150 nm were used for the refractive index of 3.5 and gx = gy = 175, 210, 260 nm for refractive index of 3, 2.5, 2, respectively.
As can be seen in the Fig. 4, transmittance is increased with the high refractive index due to the increased occupation of opening area but the bandwidth is decreased due to the out of coupling (Transmission for x and y polarization are the same in this square shape grating filter because of the same geometric parameter along the x and y axes).
FIG. 4.Transmission spectrum of the filter at fixed resonance wavelength around 550 nm while detuning refractive index of insulator.
To see the filter characteristic of the x-polarized light influenced by the y axis parameter the transmission (not normalized to the opening area) spectrum of the x-polarization is plotted in Fig. 5, while increasing values of sy from 0 to 120 nm for the fixed period (sy + gy = 260 nm) with a fixed x-axis parameter (assuming the blue filter: sx = 110 nm, gx = 40 nm). The transmittance is reduced as sy increases and the peak wavelength is blue-shifted due to the reduced MIM waveguide area.
FIG. 5.Transmission spectrum of the x-polarization blue filter with sy detuning.
The time-averaged Poynting vectors (power flow) directing the z-axis are plotted in Fig. 6 for the same conditions in Fig. 5 at ~460 nm wavelength (peak wavelength of the x-polarization at sy = 60 nm). As expected, most of the light passes through the slit opening along the x-axis (sx) and the rest passes through the slit opening along the y-axis (sy). Even though the energy is concentrated near the metal, uncoupled light still remains in the open area acting as a defect when sy is large.
FIG. 6.Time-averaged Poynting vectors showing power flow of x-polarized light in the grating (x- and y-cut views at the center of the slit and z-cut view at the interface between the substrate and the metal).
The transmission spectrum of the y-polarization is plotted in Fig. 7 for the same conditions as in the previous study. As sy increases, the transmittance increases and the peak wavelength is drastically blue-shifted in accordance with Eq. (2). However, the bandwidth widens due to the uncoupled light transmission.
FIG. 7.Transmission spectrum of y-polarization for Example 3 while detuning sy.
The time-averaged Poynting vectors directing z-axis are plotted in Fig. 8 for the same conditions of Fig. 7 at each peak wavelength (sy = 30 at 725 nm, sy = 60 at 641 nm, sy = 90 at 578 nm, sy = 120 at 532 nm). Much of the energy is concentrated near the edge of the metal and uncoupled light transmission is observed as sy increases.
FIG. 8.Time-averaged Poynting vector showing power flow of the y-polarized light in the grating (x- and y-cut view at the center of the slit and z-cut view at the interface between the substrate and metal).
To demonstrate practical applications for independent color filtering, further case studies were carried out for some examples. Examples 1-3 have a rectangular-shaped grating and work as different color filters for each polarization. Example 4 has a square-shaped grating and works as the same color filter for both polarizations. Example 1 works as a blue and green filter for x-and y-polarized light, respectively. Example 2 works as a green and red filter for x- and y-polarized light, respectively. Example 3 works as a blue and red filter for x- and y-polarized light, respectively. Example 4 works as a green filter for both of x- and y-polarized light. The geometrical parameters for these examples are listed in Table 2.
TABLE 2.Geometric parameters for examples
Figures 9(a), (b), (c), and (d) show the simulated results of Examples 1, 2, 3, and 4, respectively. Transmittance values higher than 35% were achieved for all the designed examples.
FIG. 9.Transmission spectra of Examples (a) blue-green filter, (b) green-red filter, (c) blue-red filter, and (d) green-green filter for corresponding x- and y-polarizations.
From the above study, the opening of sy is indispensable in allowing y-polarized light to be transmitted, but it affects the filtering spectrum of the x-polarization, and opening of sx is vice versa. The transmission spectra of the blue filter (for x-polarized light) in the case of (a) are slightly different from the case of (c) even with the same geometric parameters along the x-axis (gx, sx) because of the different geometric parameters along the y-axis. The same is the case for the green filter in (a), (b), and (d) and the red filter in (b) and (c). When designing the filter, therefore, the slit width must be adjusted while considering the polarization spectral interference, bandwidth, and transmittance to meet the needs of the target application.
There have been some suggestions of application area utilizing the same function with the proposed device, including chromatic polarizer [30] for polarization imaging and realization of multiple color at the single pixel for ultra-high resolution display or sensor [31, 32]. However, transmittance of the device in reference [31] is very low compared with our proposed device, and color design in the reference [30, 32] is somewhat restricted due to the band stop style of the spectrum.
Among these application areas, a feasibility study as a chromatic polarizer was carried out. A chromatic polarizer produces a continuum of colors represented by a line on the CIE (International Commission on Illumination) color space where selection of the transmitted color is made by controlling the polarization of the incident white light [30].
To suggest the reasonable parameters of practical application of our device as a chromatic polarizer, color of the filter spectrum was mapped to the CIE 1931 color space while detuning slit width with the fixed period. Figure 10(a), (b) shows the color map for the designed device in which color of the filtered light is continuously changing from blue (θp = 0°) to red (θp = 90°) in accordance with the polarization angle (where θp is the angle between polarization direction and x-axis).
FIG. 10.Color mapping of the transmitted light on the CIE 1931 color space. (a) Detuning of sx for blue to red chromatic polarizer, (b) Detuning of sy for blue to red chromatic polarizer, (c) Detuning of sx for blue to green chromatic polarizer, (d) Detuning of sy for blue to green chromatic, (e) Detuning of sx for green to red chromatic polarizer, (f) Detuning of sy for green to red chromatic polarizer.
Figure 10(a) shows color mapping with the variation of the slit width (sx) along the x axis at fixed period (sx + gx = 150 nm) and y axis parameters (sy = 60 nm, gy = 200 nm). Color is shifting to the blue at θp = 0° as the slit width gets larger in accordance with the resonance condition of Eq. (1). And, Fig. 10(b) shows color mapping with variation of sy at fixed period (sy + gy = 260 nm) and x axis parameter (sx = 60 nm, gx = 90 nm). Color is shifting to the yellow at θp = 90° as the slit width getting larger due to the reduced resonance wavelength and bandwidth broadening. Figure 10(c), (d) is for the device producing blue to green color. Figure 10(c) is detuning sx at sx + gx = 150 nm, sy = 50 nm and gy = 150 nm. And, (d) is detuning sy at sy + gy = 200 nm, sx = 40 nm and gx = 110 nm. And, Fig. 10(e), (f) is for the device producing green to red color. Figure 10(e) is detuning sx at sx + gx = 200 nm, sy = 60 nm and gy = 200 nm. And, (f) is detuning sy at sy + gy = 260 nm, sx = 50 nm and gx = 150 nm. The user can select the any parameters set that can produce the color they want but it seems be recommended to select the parameter set which can make a long locus in color space.
IV. CONCLUSION
Independent color filtering of differently polarized light using the MIM-type GMR structure has been proposed and demonstrated using numerical simulations. A parametric case study was carried out to determine the influence of the slit opening on the filtering spectrum. Blue-green, green-red, and blue-red filters for the corresponding x- and y-polarizations were demonstrated as application examples. The same green filter for both x- and y-polarization was demonstrated as another example. It was shown that a wide slit width could increase the transmittance but reduce the filter quality in terms of the selectivity and increase the interference between each transmission spectrum of polarization. It was shown that the device can be used as a chromatic polarizer by mapping the color of the filter spectrum to the CIE 1931 color space.
References
- S. S. Wang and R. Magnusson, “Theory and applications of guided-mode resonance filters,” Appl. Opt. 32, 2606-2613 (1993). https://doi.org/10.1364/AO.32.002606
- A. M. Raymond, C. Rumpf, Z. A. Roth, and E. G. Johnson, “Guided mode resonance filter as an external feedback element in a double-cladding optical fiber laser,” IEEE Photon. Technol. Lett. 19, 2030-2032 (2007). https://doi.org/10.1109/LPT.2007.908776
- S. Kaja, J. D. Hilgenberg, J. L. Clark, A. A. Shah, D. Wawro, S. Zimmerman, R. Magnusson, and P. Koulen, “Detection of novel biomarkers for ovarian cancer with an optical nanotechnology detection system enabling label-free diagnostizcs,” J. Biomed. Opt. 17, 081412-1 (2012). https://doi.org/10.1117/1.JBO.17.8.081412
- M. J. Uddin and R. Magnusson, “Guided-mode resonant thermo-optic tunable filters,” IEEE Photon. Technol. Lett. 25, 1412-1415 (2013). https://doi.org/10.1109/LPT.2013.2266272
- R. Magnusson, M. Shokooh-Saremi, and X. Wang, “Dispersion engineering with leaky-mode resonant photonic lattices,” Opt. Express 18, 108-116 (2010). https://doi.org/10.1364/OE.18.000108
- O. Kilic, S. Fan, and O. Solgaard, “Analysis of guided-resonance-based polarization beam splitting in photonic crystal slabs,” J. Opt. Soc. Am. A 25, 2680-2692 (2008). https://doi.org/10.1364/JOSAA.25.002680
- K. J. Lee, J. Giese, L. Ajayi, R. Magnusson, and E. Johnson, “Resonant grating polarizers made with silicon nitride, titanium dioxide, and silicon: Design, fabrication, and characterization,” Opt. Express 22, 9271-9281 (2014). https://doi.org/10.1364/OE.22.009271
- J. H. Barton, C. R. Garcia, E. A. Berry, R. G. May, D. T. Gray, and R. C. Rumpf, “All‐dielectric frequency selective surface for high power microwaves,” IEEE Transactions on Antennas and Propagation 62, 3652-3656 (2014). https://doi.org/10.1109/TAP.2014.2320525
- Y. Kanamori, M. Shimono, and K. Hane, “Fabrication of transmission color filters using silicon subwavelength gratings on quartz substrates,” IEEE Photon. Technol. Lett. 18, 2126-2128 (2006). https://doi.org/10.1109/LPT.2006.883208
- B.-H. Cheong, O. N. Prudnikov, E. Cho, H.-S. Kim, J. Yu, Y.-S. Cho, H.-Y. Choi, and S. T. Shin, "High angular tolerant color filter using subwavelength grating," Appl. Phys. Lett. 94, 213104 (2009). https://doi.org/10.1063/1.3139058
- E.-H. Cho, H.-S. Kim, B.-H. Cheong, P. Oleg, W. Xianyua, J.-S. Sohn, D.-J. Ma, H.-Y. Choi, N.-C. Park, and Y.-P. Park, “Two-dimensional photonic crystal color filter development,” Opt. Express 17, 8621-8629 (2009). https://doi.org/10.1364/OE.17.008621
- E.-H. Cho, H.-S. Kim, J.-S. Sohn, C.-Y. Moon, N.-C. Park, and Y.-P. Park, “Nanoimprinted photonic crystal color filters for solar-powered reflective displays,” Opt. Express 18, 27712-27722 (2010). https://doi.org/10.1364/OE.18.027712
- T. W. Ebbesen, H. J. Lezec, H. F. Ghaemi, T. Thio, and P. A. Wolff, “Extraordinary optical transmission through sub-wavelenght hole arrays,” Nature 391, 667-669 (1998). https://doi.org/10.1038/35570
- H. F. Ghaemi, T. Thio, D. E. Grupp, T. W. Ebbesen, and H. J. Lezec, “Surface plasmons enhance optical transmission through subwavelength holes,” Physical Review B, Condensed Matter and Materials Physics 58, 6779-6782 (1998). https://doi.org/10.1103/PhysRevB.58.6779
- J. A. Porto, F. J. García-Vidal, and J. B. Pendry, “Transmission resonances on metallic gratings with very narrow slits,” Physical Review Letters 83, 2845-2848 (1999). https://doi.org/10.1103/PhysRevLett.83.2845
- E. Popov, M. Neviere, S. Enoch, and R. Reinisch, "Theory of light transmission through subwavelength periodic hole arrays," Physical Review B 62, 16100 (2000). https://doi.org/10.1103/PhysRevB.62.16100
- Q. Cao and P. Lalanne, "Negative role of surface plasmons in the transmission of metallic gratings with very narrow slits," Physical Review Letters 88, 057403 (2002). https://doi.org/10.1103/PhysRevLett.88.057403
- K. Walls, Q. Chen, S. Collins, D. R. S. Cumming, and T. D. Drysdale, “Automated design, fabrication, and characterization of color matching plasmonic filters,” IEEE Photon. Technol. Lett. 24, 602-604 (2012). https://doi.org/10.1109/LPT.2012.2184531
- Q. Chen and D. R. S. Cumming, “High transmission and low color cross-talk plasmonic color filters using triangular-lattice hole arrays in aluminum films,” Opt. Express 18, 14056-14062 (2010). https://doi.org/10.1364/OE.18.014056
- Q. Chen, D. Chitnis, K. Walls, T. D. Drysdale, S. Collins, and D. R. S. Cumming, “CMOS photodetectors integrated with plasmonic color filters,” IEEE Photon. Technol. Lett. 24, 197-199 (2012). https://doi.org/10.1109/LPT.2011.2176333
- Q. Chen, D. Das, D. Chitnis, K. Walls, T. D. Drysdale, S. Collins, and D. R. S. Cumming, “A CMOS image sensor integrated with plasmonic colour filters,” Plasmonics 7, 695-699 (2012). https://doi.org/10.1007/s11468-012-9360-6
- F. Przybilla, A. Degiron, C. Genet, T. W. Ebbesen, F. de Léon-Pérez, J. Bravo-Abad, F. J. García-Vidal, and L. Martín-Moreno, “Efficiency and finite size effects in enhanced transmission through subwavelength apertures,” Opt. Express 16, 9571-9579 (2008). https://doi.org/10.1364/OE.16.009571
- S. Yokogawa, S. P. Burgos, and H. A. Atwater, “Plasmonic color filters for CMOS image sensor applications,” Nano Lett. 12, 4349-4354 (2012). https://doi.org/10.1021/nl302110z
- S. P. Burgos, S. Yokogawa, and H. A. Atwater, “Color imaging via nearest neighbor hole coupling in plasmonic color filters integrated onto a complementary metal-oxide semiconductor image sensor,” Acs Nano 7, 10038-10047 (2013). https://doi.org/10.1021/nn403991d
- D. Inoue, A. Miura, T. Nomura, H. Fujikawa, K. Sato, N. Ikeda, D. Tsuya, Y. Sugimoto, and Y. Koide, "Polarization independent visible color filter comprising an aluminum film with surface plasmon enhanced transmission through a subwavelength array of holes," Appl. Phys. Lett. 98, 093113 (2011). https://doi.org/10.1063/1.3560467
- G. Si, Y. Zhao, H. Liu, S. Teo, M. Zhang, T. J. Huang, A. J. Danner, and J. Teng, "Annular aperture array based color filter," Appl. Phys. Lett. 99, 033105 (2011). https://doi.org/10.1063/1.3608147
- H. Lee, Y. Yoon, S. Lee, S. Kim, and K. Lee, “Color filter based on a subwavelength patterned metal grating,” Opt. Express 15, 15457-15463 (2007). https://doi.org/10.1364/OE.15.015457
- T. Xu, Y.-K. Wu, X. Luo, and L. J. Guo, "Plasmonic nanoresonators for high-resolution colour filtering and spectral imaging," Nature Communication 1, 59 (2010).
- A. D. Rakic, A. B. Djurisic, J. M. Elazar, and M. L. Majewski, “Optical properties of metallic films for vertical-cavity optoelectronic devices,” Appl. Opt. 37, 5271-5283 (1998). https://doi.org/10.1364/AO.37.005271
- T. Ellenbogen, K. Seo, and K. B. Crozier, “Chromatic plasmonic polarizers for active visible color filtering and polarimetry,” Nano Lett. 12, 1026-1031 (2012). https://doi.org/10.1021/nl204257g
- H. Yun, S. Lee, K. Hong, J. Yeom, and B. Lee, "Plasmonic cavity-apertures as dynamic pixels for the simultaneous control of colour and intensity," Nature Communication 6, 7133 (2015). https://doi.org/10.1038/ncomms8133
- Y. Dirix, C. Bastiaansen, W. Caseri, and P. Smith, “Oriented pearl-necklace arrays of metallic nanoparticles in polymers: A new route toward polarization-dependent color filters,” Advanced Materials 11, 223-223 (1999). https://doi.org/10.1002/(SICI)1521-4095(199903)11:3<223::AID-ADMA223>3.0.CO;2-J
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