Litcius/Paper detail

Solution of time‐fractional stochastic nonlinear sine‐Gordon equation via finite difference and meshfree techniques

Farshid Mirzaee, Shadi Rezaei, Nasrin Samadyar

2021Mathematical Methods in the Applied Sciences75 citationsDOI

Abstract

In this article, we introduce a numerical procedure to solve time‐fractional stochastic sine‐Gordon equation. The suggested technique is based on finite difference method and radial basis functions interpolation. By using this algorithm, first time‐fractional stochastic nonlinear sine‐Gordon equation is converted to elliptic stochastic differential equations. Then, the meshfree method based on radial basis functions (RBFs) is used to approximate the obtained equation. In fact, the finite difference method is used to approximate the unknown function in the time direction and generalized Gaussian RBF is applied to estimate the obtained equation in the space direction. The most important advantage of this method is that the noise terms are simulated directly at the collocation points at each time step. By employing this method, the equation decreased to a nonlinear system of algebraic equations which can be solved simply. The obtained results of solving three examples confirm the validity and capability of the proposed solution.

Topics & Concepts

MathematicsMathematical analysisNonlinear systemPartial differential equationFinite difference methodCollocation methodCollocation (remote sensing)Finite differenceBurgers' equationAlgebraic equationApplied mathematicsDifferential equationOrdinary differential equationQuantum mechanicsGeologyRemote sensingPhysicsFractional Differential Equations SolutionsNumerical methods for differential equationsDifferential Equations and Numerical Methods
Solution of time‐fractional stochastic nonlinear sine‐Gordon equation via finite difference and meshfree techniques | Litcius