Akademik Veri Yönetim Sistemi
ICAME 2021, Balıkesir, Türkiye, 1 - 03 Eylül 2021, sa.25, ss.1-6
The Kundu-Eckhaus equation (KEE) is a nonlinear partial
differential equation in the nonlinear Schrödinger equation (NLSE) class. This
equation was introduced to the scientific literature independently by Kundu [1]
and Eckhaus [2]. It is well-known that KEE admits many different analytical
solutions like the NLSE. Those solutions of the KEE are widely used in fields
such as nonlinear optics, fiber optical waveforms, water waves mechanics, and
hydraulics, just to name a few. In this study, the effect of loss/gain on the
soliton solutions of the KEE has been investigated. With this aim, we study the
dissipative Kundu-Eckhaus equation (dKEE) [4-5]. We analyze the effects of
dissipation in the form of a loss term on the self-localized solitons of the
dKEE. For this purpose, we propose a Petviashvili’s method (PM) for the
numerical construction of the soliton solution of the dKEE [6]. Using PM, we
first numerically compute the soliton solutions of the dKEE and discuss their
properties. Then, we analyze the effects of dissipation on the dynamics and
stabilities of those soliton using a split-step Fourier method (SSFM)
implemented for time-stepping purposes. We show that the dKEE equation admits
one and two soliton solutions for zero potential and for photorefractive
potential cases. Since the solitons
under the photorefractive potentials turned out to be unstable during temporal
evolution, we introduce and discuss the effects of dissipation on the dynamics
and stabilization of those solitons. The effects of dissipation on soliton
characteristics and power are also discussed.