A nonlinear parabolic problem with singular terms and nonregular data

Abstract

We study existence of nonnegative solutions to a nonlinear parabolic boundary value problem with a general singular lower order term and a nonnegative measure as nonhomogeneous datum, of the form cases ut - p u = h(u)f+μ & in\ × (0,T),\\ u=0 &on\ ∂ × (0,T),\\ u=u0 &in\ × \0\, cases where is an open bounded subset of RN (N2), u0 is a nonnegative integrable function, p is the p-laplace operator, μ is a nonnegative bounded Radon measure on × (0,T) and f is a nonnegative function of L1( × (0,T)). The term h is a positive continuous function possibly blowing up at the origin. Furthermore, we show uniqueness of finite energy solutions in presence of a nonincreasing h.