On the generalised Brezis-Nirenberg problem

Abstract

For p ∈ (1,N) and a domain in RN, we study the following quasi-linear problem involving the critical growth: eqnarray* -p u - μ g|u|p-2u = |u|p*-2u \ in Dp(), eqnarray* where p is the p-Laplace operator defined as p(u) = div(|∇ u|p-2 ∇ u), p*= NpN-p is the critical Sobolev exponent and Dp() is the Beppo-Levi space defined as the completion of Cc∞() with respect to the norm \|u\|Dp := [ ∫ |∇ u|p dx ] 1p. In this article, we provide various sufficient conditions on g and so that the above problem admits a positive solution for certain range of μ. As a consequence, for N ≥ p2, if g is such that g+ ≠ 0 and the map u ∫ |g||u|p dx is compact on Dp(), we show that the problem under consideration has a positive solution for certain range of μ. Further, for =RN, we give a necessary condition for the existence of positive solution.

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