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We explore the coherent perfect absorption of light in a nonlocal metal-dielectric composite film in which metallic nanoparticles (gold) are randomly embedded in the dielectric host medium (silica). The two coherent light beams illuminate the gold-silica composite slab respectively from the left and right sides at the same angle of incidence and the conditions required for coherent perfect absorption are investigated each as a function of different system parameters. Under different system parameters, we study the coherent perfect absorption of a nonlocal particle composite medium. A nonlocal effective medium theory is proposed to approximately describe the metal-dielectric composite film. The effective permittivity and effective permeability of the composite medium are approximated by using the effective medium theory under the model of coated sphere with core and shell. According to the effective dielectric parameters of the composite medium, we can obtain the transmission coefficient and reflection coefficient of the plane wave incident on the slab. By comparing and analyzing the coherent perfect absorptions of the composite medium under nonlocal and local conditions, we find that under the influence of nonlocal effect when the size of particle is very small, the frequency range of incident light that produces the coherent perfect absorption of the composite medium increases and the small size can also cause the coherent perfect absorption to occur in wider frequency range. Especially, we pay attention to the choosing of physical parameters in the design of coherent perfect absorption with macroscopic composite slab when we take the nonlocal effect (or spatial dispersion) into account. In the further calculation, the coherent perfect absorption of the composite medium can be realized by changing the system parameters such as the thickness of composite slab, the wavelength of incident light, the volume fraction of metal particles, etc. We also bring about the coherent perfect absorption at a small volume fraction which satisfies all the conditions. Finally, according to these results, we can realize the control of the coherent perfect absorption with nonlocal effect. Our study may be helpful in designing the optical nanoabsorbers.
[1] Dutta-Gupta S, Martin O J F, Gupta S D, Agarwal G S 2012 Opt. Express 20 001330Google Scholar
[2] Sanjeeb D 2015 Opt. Commun. 356 515Google Scholar
[3] Fu Y Y, Xu Y D, Chen H Y, Cummer S 2017 New J. Phys. 20 013015Google Scholar
[4] Huang S, Xie Z W, Chen W D, Lei J Q, Wang F L, Liu K, Li L 2018 Opt. Express 26 7066Google Scholar
[5] Müllers A, Santra B, Baals C, Jiang J, Benary J, Labouvie R, Zezyulin D A, Konotop V V, Ott H 2018 Sci. Adv. 4 eaat6539Google Scholar
[6] Ruppin R 1973 Phys. Rev. Lett. 31 1434Google Scholar
[7] Fuchs R, Claro F 1987 Phys. Rev. B 35 3722Google Scholar
[8] Rojas R, Claro F, Fuchs R 1988 Phys. Rev. B 37 6799Google Scholar
[9] Chang R, Leung P T 2006 Phys. Rev. B 73 125438Google Scholar
[10] Xie H Y, Chung H Y, Leung P T, Tsai D P 2009 Phys. Rev. B 80 155448Google Scholar
[11] Huang Y, Gao L 2013 Prog. Electromagn. Res. 133 591Google Scholar
[12] Huang Y, Bian X, Ni Y X, Miroshnichenko A E, Gao L 2014 Phys. Rev. A 89 053824Google Scholar
[13] McMahon J M, Gray S K, Schatz G C 2010 Nano Lett. 10 3473Google Scholar
[14] Toscano G, Raza S, Jauho A P, Mortensen N A, Wubs M 2012 Opt. Express 20 4176Google Scholar
[15] Zuloaga J, Prodan E, Nordlander P 2009 Nano Lett. 9 887Google Scholar
[16] Esteban R, Borisov A G, Nordlander P, Aizpurua J 2012 Nat. Commun. 3 825Google Scholar
[17] Dong T Y, Ma X K, Mittra R 2012 Appl. Phys. Lett. 101 233111Google Scholar
[18] Stell L, Zhang P, García-Vidal F J, Rubio A, García-González P 2013 J. Phys. Chem. C 117 8941Google Scholar
[19] Maxwell G J C 1906 Philos. Trans. Roy. Soc. London 205 237Google Scholar
[20] Bruggeman D A G 1935 Ann. Phys. (Leipzig)
24 636Google Scholar [21] Huang Y, Gao L 2013 J. Phys. Chem. C 117 19203Google Scholar
[22] Dias E J C, Iranzo D A, Gonçalves P A D, Hajati Y, Bludov Y V, Jauho A P, Mortensen N A, Koppens F H L, Peres N M R 2018 Phys. Rev. B 97 245405Google Scholar
[23] Agarwal G S, O'Neil S V 1983 Phys. Rev. B 28 487Google Scholar
[24] Mcmahon J, Gray S, Schatz G 2009 Phys. Rev. Lett. 103 097403Google Scholar
[25] Dasgupta B B, Fuchs R 1981 Phys. Rev. B 24 554Google Scholar
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图 3 (a1) f = 0.1, (b1) f = 0.01, (c1) f = 0.0012时有效介电常数的实部; (a2) f = 0.1, (b2) f = 0.01, (c2) f = 0.0012时有效介电常数的虚部随
$\lambda $ 的变化; 此时d为5${\text{μ}}{\rm m}$ , a为2 nmFigure 3. (a1), (b1) and (c1) are the real parts of effective permittivity as function of
$\lambda $ , for (a1) f = 0.1, (b1) f = 0.01, (c1) f = 0.0012; (a2), (b2), (c2) are the imaginary parts of effective permittivity as function of$\lambda $ , for (a2) f = 0.1, (b2) f = 0.01, (c2) f = 0.0012. d = 5${\text{μ}}{\rm m}$ , a = 2 nm.图 4 (a1), (b1), (c1) a = 2, 5, 10 nm时, 局域效应下
$\lg|r_1+t_2|^2$ 与$\lambda $ 和f的函数关系; (a2), (b2), (c2)对应情况下考虑非局域效应时的结果; 入射角$\theta$ = 45°Figure 4.
$\lg |r_1 \!+\! t_2|^2$ as functions of$\lambda $ and f with different metallic nanoparticle radius (a) a = 2 nm, (b) a = 5 nm, (c)a = 10 nm: (a1), (b1) and (c1) are within the local description and (a2), (b2) and (c2) are within the nonlocal description. The incident angle is$\theta$ =45°.图 5 (a) d = 2
${\text{μ}}{\rm m}$ , (b) d = 5${\text{μ}}{\rm m}$ , (c)、d = 10${\text{μ}}{\rm m}$ 时散射光强对数${\log _{10}}{\left| {{r_1} + {t_2}} \right|^2}$ 与$\lambda $ 和f的函数关系图, 此时入射角$\theta $ 为45°Figure 5.
${\log _{10}}{\left| {{r_1} + {t_2}} \right|^2}$ as functions of$\lambda $ and f with thickness of medium plate (a) d = 2${\text{μ}}{\rm m}$ , (b) d = 5${\text{μ}}{\rm m}$ , (c) d = 10${\text{μ}}{\rm m}$ . The incident angle is$\theta $ = 45°.图 7 f = 0.0012,
$\theta $ = 45°时, (a)$\left| {r_1 } \right|$ (蓝色)、$\left| {t_2 } \right|$ (红色)与$\lambda $ 的函数关系, (b)$\left| {\Delta \phi } \right|/{\text{π}}$ 与$\lambda $ 的函数关系, (c)${\log _{10}}{\left| {{r_1} + {t_2}} \right|^2}$ 与$\lambda $ 的函数关系Figure 7. For f = 0.0012,
$\theta $ = 45°, (a)$\left| {r_1 } \right|$ (blue),$\left| {t_2 } \right|$ (red) as function of$\lambda $ , (b)$\left| {\Delta \phi } \right|/{\text{π}}$ as function of$\lambda $ , (c)${\log _{10}}{\left| {{r_1} + {t_2}} \right|^2}$ as function of$\lambda $ .图 8
$\lambda $ = 310 nm,$\theta = 45^\circ $ 时, (a)$\left| {r_1 } \right|$ (蓝色),$\left| {t_2 } \right|$ (红色)与f的函数关系; (b)$\left| {\Delta \phi } \right|/{\text{π}}$ 与f的函数关系; (c)${\log _{10}}{\left| {{r_1} + {t_2}} \right|^2}$ 与f的函数关系Figure 8. For
$\lambda $ = 310 nm,$\theta = 45^\circ $ , (a)$\left| {r_1 } \right|$ (blue),$\left| {t_2 } \right|$ (red) as function of f, (b)$\left| {\Delta \phi } \right|/{\text{π}}$ as function of f, (c)${\log _{10}}{\left| {{r_1} + {t_2}} \right|^2}$ as function of f. -
[1] Dutta-Gupta S, Martin O J F, Gupta S D, Agarwal G S 2012 Opt. Express 20 001330Google Scholar
[2] Sanjeeb D 2015 Opt. Commun. 356 515Google Scholar
[3] Fu Y Y, Xu Y D, Chen H Y, Cummer S 2017 New J. Phys. 20 013015Google Scholar
[4] Huang S, Xie Z W, Chen W D, Lei J Q, Wang F L, Liu K, Li L 2018 Opt. Express 26 7066Google Scholar
[5] Müllers A, Santra B, Baals C, Jiang J, Benary J, Labouvie R, Zezyulin D A, Konotop V V, Ott H 2018 Sci. Adv. 4 eaat6539Google Scholar
[6] Ruppin R 1973 Phys. Rev. Lett. 31 1434Google Scholar
[7] Fuchs R, Claro F 1987 Phys. Rev. B 35 3722Google Scholar
[8] Rojas R, Claro F, Fuchs R 1988 Phys. Rev. B 37 6799Google Scholar
[9] Chang R, Leung P T 2006 Phys. Rev. B 73 125438Google Scholar
[10] Xie H Y, Chung H Y, Leung P T, Tsai D P 2009 Phys. Rev. B 80 155448Google Scholar
[11] Huang Y, Gao L 2013 Prog. Electromagn. Res. 133 591Google Scholar
[12] Huang Y, Bian X, Ni Y X, Miroshnichenko A E, Gao L 2014 Phys. Rev. A 89 053824Google Scholar
[13] McMahon J M, Gray S K, Schatz G C 2010 Nano Lett. 10 3473Google Scholar
[14] Toscano G, Raza S, Jauho A P, Mortensen N A, Wubs M 2012 Opt. Express 20 4176Google Scholar
[15] Zuloaga J, Prodan E, Nordlander P 2009 Nano Lett. 9 887Google Scholar
[16] Esteban R, Borisov A G, Nordlander P, Aizpurua J 2012 Nat. Commun. 3 825Google Scholar
[17] Dong T Y, Ma X K, Mittra R 2012 Appl. Phys. Lett. 101 233111Google Scholar
[18] Stell L, Zhang P, García-Vidal F J, Rubio A, García-González P 2013 J. Phys. Chem. C 117 8941Google Scholar
[19] Maxwell G J C 1906 Philos. Trans. Roy. Soc. London 205 237Google Scholar
[20] Bruggeman D A G 1935 Ann. Phys. (Leipzig)
24 636Google Scholar [21] Huang Y, Gao L 2013 J. Phys. Chem. C 117 19203Google Scholar
[22] Dias E J C, Iranzo D A, Gonçalves P A D, Hajati Y, Bludov Y V, Jauho A P, Mortensen N A, Koppens F H L, Peres N M R 2018 Phys. Rev. B 97 245405Google Scholar
[23] Agarwal G S, O'Neil S V 1983 Phys. Rev. B 28 487Google Scholar
[24] Mcmahon J, Gray S, Schatz G 2009 Phys. Rev. Lett. 103 097403Google Scholar
[25] Dasgupta B B, Fuchs R 1981 Phys. Rev. B 24 554Google Scholar
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