Abstract
We consider in this paper the stochastic nonlinear Schrodinger equation forced by multiplicative noise in the Ito sense. We use two different methods as sine-cosine method and Riccati-Bernoulli sub-ODE method to obtain new rational, trigonometric and hyperbolic stochastic solutions. These stochastic solutions are of a qualitatively distinct nature based on the parameters. Moreover, the effect of the multiplicative noise on the solutions of nonlinear Schrodinger equation will be discussed. Finally, two and three-dimensional graphs for some solutions have been given to support our analysis.