Abstract
We study the existence and stability of fundamental bright discrete solitons in a parity-time- (PT-) symmetric coupler composed by a chain of dimers that is modelled by linearly coupled discrete nonlinear Schrödinger equations with gain and loss terms. We use a perturbation theory for small coupling between the lattices to perform the analysis, which is then confirmed by numerical calculations. Such analysis is based on the concept of the so-called anticontinuum limit approach. We consider the fundamental onsite and intersite bright solitons. Each solution has symmetric and antisymmetric configurations between the arms. The stability of the solutions is then determined by solving the corresponding eigenvalue problem. We obtain that both symmetric and antisymmetric onsite mode can be stable for small coupling, in contrast to the reported continuum limit where the antisymmetric solutions are always unstable. The instability is either due to the internal modes crossing the origin or the appearance of a quartet of complex eigenvalues. In general, the gain-loss term can be considered parasitic as it reduces the stability region of the onsite solitons. Additionally, we analyse the dynamic behaviour of the onsite and intersite solitons when unstable, where typically it is either in the form of travelling solitons or soliton blow-ups.
Highlights
A system of equations is PT-symmetric if it is invariant with respect to combined parity (P) and time-reversal (T) transformations
The symmetry is interesting as it forms a particular class of non-Hermitian Hamiltonians in quantum mechanics [1], which may have a real spectrum up to a critical value of the complex potential parameter, above which the system is in the “broken PT symmetry” phase [2,3,4]
The dynamics of the nonzero eigenvalues as a function of the coupling constant is shown in the right panels of the figure, where one can see that the eigenvalues are on the imaginary axis and enter the continuous spectrum as ε increases
Summary
A system of equations is PT-symmetric if it is invariant with respect to combined parity (P) and time-reversal (T) transformations. The same equations without gain and loss were considered in [24] where the symmetric soliton loses its stability through the symmetry-breaking bifurcation at a finite value of the energy, to that in the continuous counterpart [13,14,15,16]. In addition to the asymptotic limit of weak coupling between the dimers, we propose to consider expansions in the coefficient of the gain-loss terms. In this case, explicit computations of the asymptotic series of the eigenvalues become possible.
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