2011
DOI: 10.1103/physreve.83.066608
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PT-symmetric oligomers: Analytical solutions, linear stability, and nonlinear dynamics

Abstract: In the present work we focus on the case of (few-site) configurations respecting the parity-time (PT ) symmetry, i.e., with a spatially odd gain-loss profile. We examine the case of such "oligomers" with not only two sites, as in earlier works, but also the cases of three and four sites. While in the former case of recent experimental interest the picture of existing stationary solutions and their stability is fairly straightforward, the latter cases reveal a considerable additional complexity of solutions, in… Show more

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Cited by 145 publications
(211 citation statements)
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“…(19) shows that there are up to five (at least one) branches of stationary solutions of Eqs. (18) depending on the particular values of b and k. The dependence of these branches on gain/loss parameter γ for particular case b = k = 1 has been discussed in detail in [58,68]. Three different branches were found: first branch is mostly unstable (except small region that splits unstable region into two domains), while the second one is chiefly stable.…”
Section: Pt-symmetric Trimermentioning
confidence: 99%
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“…(19) shows that there are up to five (at least one) branches of stationary solutions of Eqs. (18) depending on the particular values of b and k. The dependence of these branches on gain/loss parameter γ for particular case b = k = 1 has been discussed in detail in [58,68]. Three different branches were found: first branch is mostly unstable (except small region that splits unstable region into two domains), while the second one is chiefly stable.…”
Section: Pt-symmetric Trimermentioning
confidence: 99%
“…The nonlinear effects in PT-symmetric systems can be utilized for an efficient control of light including all-optical low-threshold switching and unidirectional invisibility [24,56,57]. The possibility to engineer PT-symmetric oligomers, which may include nonlinearity, triggers a broad variety of studies on both the few-site systems and entire PT-symmetric lattices, including onedimensional PT-symmetric dimer [35,58], trimer [58,59], quadrimer [58,60], 2D PT-symmetric plaquettes [60,61], PT-symmetric finite/infinite chains [62][63][64][65], necklaces [66] and multicore fibers [67].…”
Section: Discrete Pt-symmetric Oligomersmentioning
confidence: 99%
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“…These include, among others, unconventional beam refraction [13], Bragg scattering [14], symmetry-breaking transitions [4] and associated ghost states [15][16][17][18], a loss-induced optical transparency [5], conical diffraction [19], a new type of Fano resonance [20], chaos [21], nonlocal boundary effects [22], optical switches [23] and diodes [24,25], phase sensitivity of light dynamics [26][27][28], and the possibility of linear and nonlinear wave amplification and filtering [29][30][31]. Unexpected instabilities were also * saadatmand.d@gmail.com † dmitriev.sergey.v@gmail.com ‡ borisovdi@yandex.ru § kevrekid@math.umass.edu identified at the level of PT -symmetric lattices, and nonlinear modes were identified in few-site oligomers, as well as in full lattice settings both in one dimension [32][33][34][35][36][37] and even in two dimensions [38]. Extensions of PT -symmetric considerations in the setting of active media (of unequal gain and loss) have also recently been proposed [39,40].…”
Section: Introductionmentioning
confidence: 99%
“…Equation (24) gives rise to the commonly-known vast set of single-and multi-soliton solutions [13,14], which generates the respective two-component solutions via Equation (23). The analysis of the stability of this solution is a subject for a separate work.…”
Section: The Small-amplitude Limit: Coupled Nls Equationsmentioning
confidence: 99%