Effects of Brownian noise strength on new chiral solitary structures

Abstract: In this paper, we investigate the nonlinear Chiral Schrödinger equation (CNLSE) in two dimensions where noise term affected randomly with time. This equation characterized some edges states of fractional-Hall Effect features in quantum. The CNLSE with multiplicative noise effects is studied as dynamical system to specify the acceptable solution types and then solved by unified solver method. The presented solutions are periodic envelopes, explosive, dissipative, symmetric solitons, and blow up waves. It was co… Show more

“…Biswas obtained topological and nontopological solitons for a chiral NLSE model with time-dependent and constant coefficients [18]. Alharbi et al investigated the dynamical Brownian stochastic CNLSE in two dimensions [19]. It was noted that the random noise parameter modulated the solitonic structures.…”

Characteristics of New Stochastic Solitonic Solutions for the Chiral Type of Nonlinear Schrödinger Equation

“…Biswas obtained topological and nontopological solitons for a chiral NLSE model with time-dependent and constant coefficients [18]. Alharbi et al investigated the dynamical Brownian stochastic CNLSE in two dimensions [19]. It was noted that the random noise parameter modulated the solitonic structures.…”

Characteristics of New Stochastic Solitonic Solutions for the Chiral Type of Nonlinear Schrödinger Equation

Quantum analysis of nonlinear optics in Kerr affected saturable nonlinear media and multiplicative noise: a path to new discoveries

Dynamics of novel exact soliton solutions to Stochastic Chiral Nonlinear Schrödinger Equation