Stability for evolution equations with variable growth

Abstract

We study the character of dependence on the data and the nonlinear structure of the equation for the solutions of the homogeneous Dirichlet problem for the evolution p(x,t)-Laplacian with the nonlinear source \[ ut-p(x,t)u=f(x,t,u), (x,t)∈ Q=× (0,T), \] where is a bounded domain in Rn, n≥ 2, and p(x,t) is a given function p(·):Q (2nn+2,p+], p+<∞. It is shown that the solution is stable with respect to perturbations of the variable exponent p(x,t), the nonlinear source term f(x,t,u), and the initial data. We obtain quantitative estimates on the norm of the difference between two solutions in a variable Sobolev space through the norms of perturbations of the nonlinearity exponent and the data u(x,0), f. Estimates on the rate of convergence of a sequence of solutions to the solution of the limit problem are derived.