Initial trace of solutions of Hamilton-Jacobi parabolic equation with absorption

Abstract

Here we study the initial trace problem for the nonnegative solutions of the equation \[ u\t- u+|∇ u|q=0 \] in Q\,T=×( 0,T) , T≤q∞, where q>0, and =RN, or is a smooth bounded domain of RN and u=0 on ∂×( 0,T) . We can define the trace at t=0 as a nonnegative Borel measure (S ,u\0), where S is the closed set where it is infinite, and u\0 is a Radon measure on . We show that the trace is a Radon measure when q≤q1. For q∈(1,(N+2)/(N+1) and any given Borel measure, we show the existence of a minimal solution, and a maximal one on conditions on u\0. When S =ω and ω is an open subset of , the existence extends to any q≤q2 when u\0∈ L\loc1() and any q>1 when u\0=0. In particular there exists a self-similar nonradial solution with trace (RN+,0), with a growth rate of order x q as x →∞ for fixed t. Moreover we show that the solutions with trace (ω,0) in Q\RN,T may present near t=0 a growth rate of order t-1/(q-1) in ω and of order t-(2-q)/(q-1) on ∂ ω.