on a second critical value for the local existence of solutions in lebesgue spaces

Abstract

We provide new conditions for the local existence of solutions to the time-weighted parabolic equation ut - u = h(t)f(u) in × (0,T), where is a arbitrary smooth domain, f∈ C(R), h∈ C([0,∞)) and u(0)∈ Lr(). As consequence of our results, considering a suitable behavior of the non-negative initial data, we obtain a second critical value = 2r/(p-1), when f(u)=up and p> 1 + 2r/N, which determines the existence (or not) of a local solution u ∈ L∞((0,T), Lr()).

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