摘要:In this paper, we study the dynamical behavior of the solution for the stochastic reaction–diffusion equation with the nonlinearity satisfying the polynomial growth of arbitrary order $p\geq2$ and any space dimension N. Based on the inductive principle, the higher-order integrability of the difference of the solutions near the initial data is established, and then the (norm-to-norm) continuity of solutions with respect to the initial data in $H_(^)(U)$ is first obtained. As an application, we show the existence of $(L^,(U),L^{p}(U))$ and $(L^,(U),H_(^)(U))$-pullback random attractors, respectively.
关键词:Stochastic reaction–diffusion equation;Higher-order integrability;Pullback random attractor;Norm-to-norm continuity;
