Extremal functions for the anisotropic Sobolev inequalities

Abstract

The existence of multiple nonnegative solutions to the anisotropic critical problem - Σi=1N ∂∂ xi (| ∂ u∂ xi |pi-2 ∂ u∂ xi) = |u|p*-2 u in RN is proved in suitable anisotropic Sobolev spaces. The solutions correspond to extremal functions of a certain best Sobolev constant. The main tool in our study is an adaptation of the well-known concentration-compactness lemma of P.-L. Lions to anisotropic operators. Futhermore, we show that the set of nontrival solutions is included in L∞(N) and is located outside of a ball of radius τ >0 in Lp*(N).