Local and global properties of solutions of heat equation with superlinear absorption

Abstract

We study the limit, when k∞ of solutions of ut- u+f(u)=0 in RN×(0,∞) with initial data k, when f is a positive increasing function. We prove that there exist essentially three types of possible behaviour according f-1 and F-1/2 belong or not to L1(1,∞), where F(t)=∫0t f(s)ds. We emphasize the case where f(u)=u(( u+1))α. We use these results for giving a general result on the existence of the initial trace and some non-uniqueness results for regular solutions with unbounded initial data.