Renormalized Solution for the Nonlinear Parabolic Problem with Lower Order Terms

Abstract

In this paper, we consider the following nonlinear parabolic equation with non-coercive terms in \(RN\) space \[ ∂ u∂ t -∇ · (a(x,t,u,∇ u)+ (x,t,∇ u))=f, in × (0,T). \] Here \(\) is a bounded open set of \(RN\) with the boundary \(∂ \) satisfying Lipschitz condition. The Carath\'eodory function \(\) is restricted by |(x,t,s)| c(x,t)|s|γ with parameters depending on p and N. And the initial value u(x,0)=u0(x). For convenience, we define the domain Q := × (0,T) and the boundary similarly. Then for f∈ L1(Q) and u0∈ L1(), we prove the existence and uniqueness of a renormalized solution via truncation methods, monotone operator theory, and a prior gradient estimates.