On the existence threshold for positive solutions of p-laplacian equations with a concave-convex nonlinearity

Abstract

We study the following boundary value problem with a concave-convex nonlinearity: equation* \ arrayr c l l -p u & = & \,uq-1+ ur-1 & in , \\ u & = & 0 & on ∂. array. equation* Here ⊂ Rn is a bounded domain and 1<q<p<r<p*. It is well known that there exists a number q,r>0 such that the problem admits at least two positive solutions for 0<<q,r, at least one positive solution for =q,r, and no positive solution for > q,r. We show that \[ q p q,r = λ1(p), \] where λ1(p) is the first eigenvalue of the p-laplacian. It is worth noticing that λ1(p) is the threshold for existence/nonexistence of positive solutions to the above problem in the limit case q=p.