Well-posedness, Global existence and decay estimates for the heat equation with general power-exponential nonlinearities

Abstract

In this paper we consider the problem: ∂t u- u=f(u),\; u(0)=u0∈ Lp(N), where p>1 and f : having an exponential growth at infinity with f(0)=0. We prove local well-posedness in Lp0(N) for f(u) e|u|q,\;0<q≤ p,\; |u| ∞. However, if for some λ>0, s ∞(f(s)\,e-λ sp)>0, then non-existence occurs in Lp(N). Under smallness condition on the initial data and for exponential nonlinearity f such that |f(u)| |u|m as u 0, N(m-1) 2≥ p, we show that the solution is global. In particular, p-1>0 sufficiently small is allowed. Moreover, we obtain decay estimates in Lebesgue spaces for large time which depend on m.