The role of absorption terms in Dirichlet problems for the prescribed mean curvature equation

Abstract

In this paper we study existence and uniqueness of solutions to Dirichlet problems as cases g(u) - div(D u1+|D u|2) = f & in\;,\\ u=0 & on\;∂, cases where is an open bounded subset of RN (N≥ 2) with Lipschitz boundary, g:R is a continuous function and f belongs to some Lebesgue spaces. In particular, under suitable saturation and sign assumptions, we explore the regularizing effect given by the absorption term g(u) in order to get a solutions for data f merely belonging to L1() and with no smallness assumptions on the norm. We also prove a sharp boundedness result for data in LN() as well as uniqueness if g is increasing.