Coron's problem for the critical Lane-Emden system

Abstract

In this paper, we address the solvability of the critical Lane-Emden system \[cases - u=|v|p-1v &in ε,\\ - v=|u|q-1u &in ε,\\ u=v=0 &on ∂ ε, cases\] where N 4, p ∈ (1,N-1N-2), 1p+1 + 1q+1=N-2N, and ε is a smooth bounded domain with a small hole of radius ε > 0. We prove that the system admits a family of positive solutions that concentrate around the center of the hole as ε 0, obtaining a concrete qualitative description of the solutions as well. To the best of our knowledge, this is the first existence result for the critical Lane-Emden system on a bounded domain, while the non-existence result on star-shaped bounded domains has been known since the early 1990s due to Mitidieri (1993) [30] and van der Vorst (1991) [36].