Abstract
We present a dispersion theory of the surface plasmon polaritons (SPP) in random metaldielectric nanocomposite (MDN) consisting of bulk metal embedded with dielectric inclusions. We demonstrate that embedding of dielectric nanoparticles in metal results in the formation of the plasmonic bandgap due to strong coupling of the SPP at the metalvacuum interface and surface plasmons localized at the surface of nanoinclusions. Our results show that MDN can replace metals in various plasmonic devices, which properties can be tuned in a wide spectral range. Being compatible with waveguides and other photonic structures, MDN offers high flexibility in the plasmonic system design.
Background
The resonant coupling of light to oscillations of the free electron density near the metal surface, surface plasmons (SP), gave birth to a variety of advanced applications ranging from sensing to nonlinear optics. SPs are bound to the metallic surface, i.e., at the frequency of the surface plasmon resonance, light field exponentially decays in neighboring media. Since the decay length of SPs is two orders of magnitude smaller than the wavelength of the light in air, they can be employed for subwavelength localization of light. The guiding of light in plasmonic structures is possible via surface plasmon polaritons (SPP) that can propagate in periodical arrays of metal nanoparticles embedded in dielectrics. The multiple scattering of the SPPs off the periodic corrugation leads to the Bragglike plasmon modes [1,2] and to the plasmonic band gaps [1,3], i.e., they do not allow the SPP in a certain interval of wavelengths. When metal nanoparticles are placed into dielectric in a random fashion, e.g., in metal island films [4,5], nanoporous metal films [6], and metaldielectric nanocomposite (MDN) [710], no SPP bandgaps have been observed. The optical properties of these materials dominated by SPs localized on individual metal nanoparticles are well studied [11,12]; however, much less attention was paid to the behavior of SPP propagating at the MDNdielectric interface. In this paper, we present the theory of SPP in MDN based on noble metals with random distribution of the dielectric inclusions. We demonstrate that when the metal volume content is high, the coupling of propagating and localized at metalinclusion interface plasmon modes results in the formation of the SPP bandgap in such random media. By using Drude model for dielectric function of the metal, we develop dispersion theory of the SPP at the MDNvacuum surface. We demonstrate that in silver, bandgap persists when dielectric properties of the metal are described by experimental data. The presence of the SPP bandgap indicates that the MDN can replace metals in various plasmonic structures that will benefit from the tunability of the MDN properties.
Methods
We consider the interface between a dielectric with a real positive dielectric constant ϵ_{1} (z < 0) and a MDN with a frequencydependent complex dielectric function ϵ_{2}(ω) n (z > 0). The electric filed associated with SPP propagating along xaxis can be presented in the following form:
where [13]
One can observe from Equations 1 and 2 that SPP is allowed at Re(ϵ_{2}(ω) + ϵ_{1}) < 0 when Re(k_{SPP}) ≠ 0 and Im(δ_{1,2}) = 0. The condition Re(ϵ_{2}(ω) + ϵ_{1}) = 0 corresponds to the excitation of the surface plasmon [1,13]. If Re(ϵ_{2}(ω)) > 0, SPP is forbidden; however, a transversal bulk plasmon polariton (BPP) with wave vector can propagate at z > 0. If 0 > Re(ϵ_{2}(ω)) > − ϵ_{1}, no propagating electromagnetic perturbations are allowed, i.e., the energy of the incident light wave is transferred to the localized plasmons.
When the concentration of dielectric inclusions g is relatively low (g < 0.15), the dielectric constant of the MDN can be described in the framework of Maxwell Garnett approach [14] for dielectric inclusions in metal that yields
Assuming that the permittivity of metal can be described in terms of the Drude model with no scattering,
where ω_{p} is the plasma frequency, the effective dielectric function can be presented as
One can see from Equation 5 that the effective dielectric function has singularities at ω = 0 and ω = Ω_{TO}. The singularity at ω = 0 is a conventional ‘metal’ one, while the singularity at ω = Ω_{TO} corresponds to the collective oscillations of the conduction electrons at the surface of dielectric nanoparticles incorporated into the metal matrix, i.e., localized surface plasmon resonance at the metaldielectric interface. Frequency Ω_{LO} corresponds to the excitation of the longitudinal phonons in the GMN.
The surface plasmon frequency ω_{SC} at the MDNvacuum interface can be found from the condition ϵ_{eff}(ω_{SC}) = −1. Solution of this equation yields
i.e., two surface plasmon frequencies can exist. In pure metal (g = 0), SPP can propagate along the metal/vacuum interface at [13]. However, at a finite dielectric content, g > 0, the SPP band splits into two, i.e., SPP is allowed at ω_{LO}< ω < ω_{SC2} and ω < ω_{SC1}. These two SPP bands are separated by a BPP band from Ω_{LO} to Ω_{TO} and a forbidden gap between ω_{SC1} and Ω_{TO} (see Figure 1). Thus, strong coupling between SPP at the metal vacuum interface and localized surface plasmons at the surface of randomly distributed dielectric nanoinclusions results in the formation of the plasmonic bandgap, which is conventionally observed in plasmonic crystals.
Figure 1. Dispersion relation for plasmon polaritons and map of electromagnetic modes for Drude MDN without scattering. (a) Dispersion relation for plasmon polaritons at ω_{p} = 10^{16} s^{−1}, g = 0.1 and ϵ_{d} = 3.42 (blue line). The light line ω = ck is also shown. (b) Map of the electromagnetic modes in the gω plane. SPP and BPP exist in gray and hatched areas, respectively.
Results and discussion
The dispersion relation for propagating electromagnetic modes in Drude MDN with dielectric volume fraction g = 0.1 and ϵ_{d} = 3.42 is shown in Figure 1a. Figure 1b shows the map of collective excitations in Drude MDN in the ‘ωg’ plane at ϵ_{d}= 3.42. One can observe two SPP bands, the BPP band, and the forbidden gap separated by frequencies Ω_{LO}, Ω_{TO}, and ω_{SC1}. The upper limit of the higher SPP zone is ω_{SC2}. There also exists the second BPP frequency range for ω > ω_{p}. The width of both SPP and BPP bands increases with the increase of dielectric contained in MDN. The latter was earlier demonstrated by N. Stefanou and coauthors [15] for mesoporous metals. Our calculations also showed that the higher the permittivity of dielectric inclusions in MDN, the broader the upper SPP band and the bigger the downshift of the SPP forbidden gap.
When g → 0, the upper MDN surface plasmon frequency , that is, the surface plasmon frequency at metalair interface, while Ω_{LO}, Ω_{TO}, and ω_{SC1} approach , that is, the SP resonance of a single dielectric cavity in metal matrix [15]. At ϵ_{d} > 2, the frequencies Ω_{LO}, Ω_{TO}, and ω_{SC1} are lower than ω_{SC2}, and BPP zone and the conventional metal SPP band at ω < ω_{SC2} splits by two (see Figure 1b). At ϵ_{d} < 2, the Ω_{LO}, Ω_{TO}, and ω_{SC1} are higher than ω_{SC2}, and the conventional metal SPP band at ω < ω_{SC2} remains intact, however, the second SPP band appears at ω_{LO}< ω < ω_{SC2}. At .
It is worth noting that the dielectric dispersion should change the characteristic frequencies that will lead to the frequency shift of all bands and, in the case of strong dispersion, could possibly result in broadening or vanishing of the second SPP band. But for the most optically transparent dielectrics, their dispersion is negligible compared to the metal one. In this paper we neglect the dielectric dispersion that is valid, for example, for glasses in the visible and nearinfrared range.
Although Drude approximation satisfactorily describes the optical properties of noble metals, the dissipation of light energy may essentially influence the electromagnetic modes in MDN. When the imaginary part of the metal permittivity is nonzero, the effective permittivity of the MDN is also complex, ; however, the SPP on the vacuumMDN interface is allowed (i.e., ) even at relatively high dielectric volume fractions. In particular, it has been shown both experimentally and theoretically that the goldbased MDN with dielectric volume fraction of g ≈ 0.5 supports SPP [6,10]. Figure 2 presents the dependence of the real part of the effective dielectric function of MDN based on noble metals. By using the data for the complex dielectric function from Johnson and Christy [16], one can obtain that at ϵ_{d} = 3.42 (flint glass) and g = 0.1, the SPP is allowed in Au, Cu and Agbased MDNs; however, the second SPP band occurs in the Agbased MDN only. However, it is worth noting that even in the silverbased MDN, the SPP band splitting vanishes at ϵ_{d} < 2.25.
Figure 3a shows the plasmon polariton dispersion in silverbased MDN at g = 0.1 and ϵ_{d} = 3.42 calculated using measured metal permittivity and plasma frequency [16]ω_{p} = 1.39·10^{16}s^{−1}. One can observe from Figure 3a that at Re(k) > ω/c, there exist two SPP and two BPP bands.
Figure 3. Dispersion curve for silverbased MDN and map of electromagnetic modes. (a) The dispersion curve for silverbased MDN at ω_{p} = 1.39·10^{16} s^{−1}, g = 0.1 and ϵ_{d} = 3.42 (blue line). The light line ω=ck is also shown. (b) Map of the electromagnetic modes in the gω plane. SPP and BPP exist in gray and hatched areas, respectively.
Figure 3b shows the map of collective excitations in silverbased MDN on the ωg plane at ϵ_{d} = 3.42. One can observe that the shape and size of the gray area in which SPP is allowed is similar to that for Drude MDN (see Figure 1); however, the nonzero imaginary part of the dielectric permittivity of silver results in vanishing of the SPP bandgap at g < 0.03. Thus, only one surface plasmon polariton band exists at g < 0.03.
Conclusions
We demonstrate that SPP bandgap can exist not only in plasmonic crystals but also in MDN with low dielectric volume fraction, i.e., when dielectric nanoinclusions are distributed in a random fashion in metal host. In the MDN, the SPP bandgap arises due to strong coupling between SPP at the metaldielectric interface and plasmons localized on dielectric nanoinclusions allowing one to tailor the plasmonic properties by changing the dielectric content. By using MaxwellGarnett model, we calculated effective dielectric permittivity of the MDN using both Drude model and Johnson and Christy data for complex dielectric function of metal. We showed that dissipation caused by the scattering of conduction electrons in metal may result in vanishing plasmonic bandgap in noble metalbased MDN. However, at refractive index of dielectric inclusions n > 1.5, the plasmonic bandgap survives in Agbased MDN offering high flexibility in the plasmonic system design.
Abbreviations
MDN: Metaldielectric nanocomposite; SP: Surface plasmons; SPP: Surface plasmon polaritons.
Competing interests
The authors declare that they have no competing interests.
Authors’ contributions
VZh developed the models used and performed the data analysis. MP performed the dispersion related analysis. OSh obtained the numerical results and found the fitting parameters. YuS performed the analytical analysis. AL supervised the whole work starting from analysis to the interpretation of results. All authors read and approved the final manuscript.
Authors’ information
VZh holds associate professor position at St. Petersburg State Polytechnical University. MP holds PhD degree at St. Petersburg Academic University. OSh is a PhD student at St. Petersburg State Polytechnical University. YuS holds DrSci degree and professor position at the University of Eastern Finland. AL holds DrSci degree and professor positions at St. Petersburg Academic University and St. Petersburg State Polytechnical University.
Acknowledgments
This study was supported by Russian foundation for Basic Research (project no. 120291664), Russian Ministry for Education and Science, Joensuu University Foundation, Academy of Finland (project nos. 135815 and 137859) and EU (FP7 projects ‘NANOCOM’ and ‘AN2’).
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