Uniqueness and sign properties of minimizers in a quasilinear indefinite problem

Abstract

Let 1<q<p and a∈ C() be sign-changing, where is a bounded and smooth domain of RN. We show that the functional \[ Iq(u):=∫( 1p|∇ u|p-1qa(x)|u|q) , \] has exactly one nonnegative minimizer Uq (in W01,p() or W1,p()). In addition, we prove that Uq is the only possible positive solution of the associated Euler-Lagrange equation, which shows that this equation has at most one positive solution. Furthermore, we show that if q is close enough to p then Uq is positive, which also guarantees that minimizers of Iq do not change sign. Several of these results are new even for p=2.