1. Introduction
Subwavelength structures on the surface of a metal film can strongly modify its interaction with electromagnetic fields [1]. Furthermore, by placing two such metallic layers in close proximity, the strong interaction between the evanescent fields on the surfaces of two or more nanostructured metal layers could lead to novel optical properties and offer new functionalities. Many double-layer metallic subwavelength structures have been proposed such as double-layer, laterally shifted metallic subwavelength hole arrays [2], double-layer metallic subwavelength slit arrays [1], double-layer close-packed metallic gratings [3] and double-layer stacking metallic gratings with subwavelength slits [4]. These structures have been demonstrated to exhibit extraordinarily high transmission. In fact the planar dielectric gratings on thin metallic films without slits or holes can also increase the transmitted efficiency and acquire even higher transmission enhancement [5] [6] [7]. We have studied a kind of sandwich grating (SG) in which the silver thin film is sandwiched by two identical planar dielectric gratings [8]. In this paper, we emphasize on intensity distributions of the near field in the proposed sandwich grating (SG). The numerical calculations based on the expanded Rigorous Coupled-Wave Analysis (RCWA) [8] for the intensity distributions of the magnetic field (|Hy|2) help us distinct the enhanced mechanism. And we estimate the resonance wavelengths according to the momentum matching conditions of resonance.
2. The Sandwich Grating
Figure 1 depicts the basic configuration of the proposed sandwich structure gratings. Thin silver film of thickness h is sandwiched into two identical planar sinusoidal dielectric gratings. The lossless planar dielectric grating [9] [10] is characterized by a periodical medium. The relative permittivity can be depicted by
, (1)
where
is the average permittivity and
is the amplitude of the sinusoidal permittivity.
is the grating slant angle and
, here
is the grating period.
The Drude model is adopted to simulate the sandwiched Ag film in the region III with plasmon frequency
and the collision frequency
[11]. The surrounding permittivity in the region I and V is chosen to be 1.332. The detailed structure parameters are listed below: the grating period Ʌ = 400 nm, the grating thickness d = 100 nm, the average permittivity is 2.25 and the modulation is 0.33. The sandwiched silver thin film thickness is set to be 40 nm. The normal incidence wavelengths we are interested in the visible light range from 390 nm to 760 nm.
3. Numerical Calculations and Discussions
According to the expanded rigorous coupled-wave analysis theory (RCWA) for the sandwich grating [8] [9] [10], we calculate the diffractive efficiencies of
Figure 1. Schematic diagram of the sandwich grating.
E-mode polarization in sandwich structures. For E-mode polarization, the magnetic field is solely in the y-direction. The computed 0th order transmission spectrum is shown in Figure 2, where two resonant peaks are observed. One narrow peak is at the short-wavelength of 596 nm whose transmission reaches 0.613364. The other wider peak is at 647 nm, whose transmission is 0.337835.
Figure 3 visualizes the resonance mode profiles with λ = 596 nm. The red and blue colors denote the maximum and minimum of magnetic intensity, respectively. At first, both interfaces between metallic films and gratings bound enhanced energy than other regions, which demonstrates that there forms resonant surface waves either guided or SPP modes [7]. Secondly, the resonant modes are the standing Bloch waves along x-axis within a grating period (Λ) due to the regenerating two opposite direction propagating resonant modes at normal incidence. Thirdly, high intensity in the thin metallic film layer (100 nm - 140 nm in the direction of z) indicate that metallic film act as a light passageway. As a consequence, the absorption is only Ohm losses. So we can infer that the narrow resonant peak is corresponding to the guided mode resonance which cannot absorb extra energy. We estimate the resonance frequencies whether meeting a momentum matching condition. If the wave vector of guided or SPP modes matches that of scattered light, namely,
(2)
guided or SPP modes can be excited, where K = 2π/Λ is the primitive reciprocal lattice vector and m is an integer [4]. According to this matching condition, the predicted wavelength of guided mode equals the average index of grating times grating period. The under-estimated wavelength is 600 nm, very close to the resonant wavelength 596 nm.
On the contrary, in Figure 4, the energy in the metallic film is very few, which manifests that the energy is strongly absorbed by the surface plasmon resonance besides ohm losses of guided resonance. According to this matching condition λspp = Λnspp= 634 nm, close to the resonant wavelength 647 nm.
Figure 2. The computed 0th order transmission spectrum.
Figure 3. The contour profiles of intensity distributions of the magnetic field (|Hy|2) at the transmission peak wavelength of 596 nm.
Figure 4. The contour profiles of intensity distributions of the magnetic field (|Hy|2) at the transmission peak wavelength of 647 nm.
4. Conclusion
The results indicate that there are two apparent enhanced transmission peaks. The magnetic intensity distributions of these two peaks manifest that the narrow higher transmission enhancement peak is caused by guided mode resonance and the other wide low one is formed by surface plasmon resonance. The resonant wavelength was estimated by the momentum matching conditions of resonance. The completely planar structure would be exploited in the applications of nano-photonics circuits and surface plasmon resonance sensors.