Higher order evolution inequalities with nonlinear convolution terms

Abstract

We are concerned with the study of existence and nonexistence of weak solutions to cases & ∂k u∂ tk+(-)m u≥ (K |u|p)|u|q in RN × R+,\\[0.1in] & ∂i u∂ ti(x,0) = ui(x) \,\, in RN,\, 0≤ i≤ k-1,\\ cases where N,k,m≥ 1 are positive integers, p,q>0 and ui∈ L1 loc(RN) for 0≤ i≤ k-1. We assume that K is a radial positive and continuous function which decreases in a neighbourhood of infinity. In the above problem, K |u|p denotes the standard convolution operation between K(|x|) and |u|p. We obtain necessary conditions on N,m,k,p and q such that the above problem has solutions. Our analysis emphasizes the role played by the sign of ∂k-1 u∂ tk-1.