Global Lr-estimates and regularizing effect for solutions to the p(t, x) -Laplacian systems

Abstract

We consider the initial boundary value problem for the p(t, x)-Laplacian system in a bounded domain . If the initial data belongs to Lr0, r0 ≥ 2, we give a global Lr0()-regularity result uniformly in t>0 that, in the particular case r0 =∞, implies a maximum modulus theorem. Under the assumption p- = ∈f p(t, x) > 2n/(n+r0), we also state Lr0- Lr estimates for the solution, for r ≥ r0. Complete proofs of the results presented here are given in the paper [F. Crispo, P. Maremonti, M. Ruzicka, Global Lr-estimates and regularizing effect for solutions to the p(t, x) -Laplacian systems, accepted for publication on Advances in Differential Equations, 2017].