Asymptotic behavior of solutions to elliptic problems with Robin boundary conditions

Abstract

In this paper, we investigate the asymptotic behavior, as β 0, of positive solutions to the semilinear elliptic Robin problem equation* cases -Δu = up, & in Ω,\\ u > 0, & in Ω,\\ ∂ u∂ ν + βu = 0, & on ∂ Ω, cases equation* where p 0, β> 0, and Ω is a bounded smooth domain. We will prove that, for all p0, the solution uβ behaves like a constant as β0. However, the value of this constant is strongly influenced by the value of p. Indeed, itemize if 0 p < 1, uβ blows up uniformly in Ω as β 0. if p=1 (eigenvalue problem), uβ converge to a constant. if p>1 uβ converge uniformly to zero. itemize In the critical and supercritical regime p N+2N-2, the existence of solutions is no longer guaranteed a priori. In this case, when Ω is a ball and 0<β<2p-1 we prove the existence of a radial positive solution.