Pairs of positive radial solutions for a Minkowski-curvature Neumann problem with indefinite weight

Abstract

We prove the existence of a pair of positive radial solutions for the Neumann boundary value problem equation* cases \, div\,( ∇ u1- | ∇ u |2) + λ a(|x|)up = 0, & in B, \\ \, ∂u=0, & on ∂ B, cases equation* where B is a ball centered at the origin, a(|x|) is a radial sign-changing function with ∫B a(|x|)\,dx < 0, p>1 and λ > 0 is a large parameter. The proof is based on the Leray-Schauder degree theory and extends to a larger class of nonlinearities.