Initial trace of positive solutions of a class of degenerate heat equation with absorption

Abstract

We study the initial value problem with unbounded nonnegative functions or measures for the equation tu-p u+f(u)=0 in N(0,∞) where p>1, p u = div( ∇ up-2 ∇ u) and f is a continuous, nondecreasing nonnegative function such that f(0)=0. In the case p>2NN+1, we provide a sufficient condition on f for existence and uniqueness of the solutions satisfying the initial data k0 and we study their limit when k∞ according f-1 and F-1/p are integrable or not at infinity, where F(s)=∫0s f()d. We also give new results dealing with non uniqueness for the initial value problem with unbounded initial data. If p>2, we prove that, for a large class of nonlinearities f, any positive solution admits an initial trace in the class of positive Borel measures. As a model case we consider the case f(u)=u (u+1), where >0 and ≥ 0.