Very weak solutions of subquadratic parabolic systems with non-standard p(x,t)-growth

Abstract

The aim of this paper is to establish a higher integrability result for very weak solutions of certain parabolic systems whose model is the parabolic p(x,t)-Laplacian system. Under assumptions on the exponent function p:T=× (0,T)(2nn+2,2], it is shown that any very weak solution u:T→RN with |Du|p(·)(1-)∈ L1(T) belongs to the natural energy spaces, i.e. |Du|p(·)∈ L1loc(T), provided ε>0 is small enough. This extends the main result of [V. B\"ogelein and Q. Li, Nonlinear Anal., 98 (2014), pp. 190-225] to the subquadratic case.