Random dynamics for a stochastic nonlocal reaction-diffusion equation with an energy functional

Abstract

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In this paper, the asymptotic behavior of solutions to a fractional stochastic nonlocal reaction-diffusion equation with polynomial drift terms of arbitrary order in an unbounded domain was analysed. First, the stochastic equation was transformed into a random one by using a stationary change of variable. Then, we proved the existence and uniqueness of solutions for the random problem based on pathwise uniform estimates as well as the energy method. Finally, the existence of a unique pullback attractor for the random dynamical system generated by the transformed equation is shown.

Keywords

• nonlocal reaction-diffusion equations
• fractional laplacian
• unbounded domain
• random attractors