Uniform boundedness for weak solutions of quasilinear parabolic equations

Abstract

In this paper, we study the boundedness of weak solutions to quasilinear parabolic equations of the form \[ut - div A(x,t,∇ u) = 0, \] where the nonlinearity A(x,t,∇ u) is modelled after the well studied p-Laplace operator. The question of boundedness has received lot of attention over the past several decades with the existing literature showing that weak solutions in either 2NN+2<p<2, p=2 or 2<p are bounded. The proof is essentially split into three cases mainly because the estimates that have been obtained in the past always included an exponent of the form 1p-2 or 12-p which blows up as p → 2. In this note, we prove the boundedness of weak solutions in the full range 2NN+2 < p < ∞ without having to consider the singular and degenerate cases separately. Subsequently, in a slightly smaller regime of 2NN+1 < p < ∞, we also prove an improved boundedness estimate.