Admissible initial growth for diffusion equations with weakly superlinear absorption

Abstract

We study the admissible growth at infinity of initial data of positive solutions of \t u- u+f(u)=0 in \+N when f(u) is a continuous function, mildly superlinear at infinity, the model case being f(u)=u (1+u) with 12. We prove in particular that if the growth of the initial data at infinity is too strong, there is no more diffusion and the corresponding solution satisfies the ODE problem \t +f()=0 on \+ with (0)=∞.