Backward blow-up estimates and initial trace for a parabolic system of reaction-diffusion

Abstract

In this article we study the positive solutions of the parabolic semilinear system of competitive type \[ \array [c]c% ut- u+vp=0, vt- v+uq=0, array . \] in ×(0,T) , where is a domain of RN, and p,q>0, pq≠1. Despite of the lack of comparison principles, we prove local upper estimates in the superlinear case pq>1 of the form \[ u(x,t)≤q Ct-(p+1)/(pq-1), v(x,t)≤q Ct-(q+1)/(pq-1)% \] in ω×(0,T1) , for any domain ω ⊂⊂ and T1∈(0,T) , and C=C(N,p,q,T1% ,ω). For p,q>1, we prove the existence of an initial trace at time 0, which is a Borel measure on . Finally we prove that the punctual singularities at time 0 are removable when $p,q≥q1+2/N.