Logarithmic upper bounds for weak solutions to a class of parabolic equations

Abstract

It is well known that a weak solution to the initial boundary value problem for the uniformly parabolic equation ∂t-div(A∇ ) +ω= f in T×(0,T) satisfies the uniform estimate \|\|∞,T≤ \|\|∞,∂pT+c\|f\|q,T, \ \ \ c=c(N,λ, q, T), provided that q>1+N2, where is a bounded domain in RN with Lipschitz boundary, T>0, ∂pT is the parabolic boundary of T, ω∈ L1(T) with ω≥ 0, and λ is the smallest eigenvalue of the coefficient matrix A. This estimate is sharp in the sense that it generally fails if q=1+N2. In this paper we show that the linear growth of this upper bound in \|f\|q,T can be improved. To be precise, we establish equation* \|\|∞,T≤ \|0\|∞,∂pT+c\|f\|1+N2,T((\|f\|q,T+1)+1). equation*