Higher order evolution inequalities with Hardy potential in the exterior of a half-ball

Abstract

We consider semilinear higher order (in time) evolution inequalities posed in an exterior domain of the half-space R+N, N≥ 2, and involving differential operators of the form Lλ =- +λ/|x|2, where λ≥ -N2/4. A potential function of the form |x|τ, τ∈ R, is allowed in front of the power nonlinearity. Under inhomogeneous Dirichlet-type boundary conditions, we show that the dividing line with respect to existence or nonexistence is given by a Fujita-type critical exponent that depends on λ, N and τ, but independent of the order of the time derivative.