Global Compactness Result for a Br\'ezis-Nirenberg-Type Problem Involving Mixed Local Nonlocal Operator

Abstract

This paper investigates the profile decomposition of Palais-Smale sequences associated with a Brezis-Nirenberg type problem involving a combination of mixed local nonlocal operators, given by equation* \aligned &- u + (-)s u - λ u = |u|2*-2u \;\; in , & u=0\, in RN . aligned . equation* where ⊂eq RN is a smooth bounded domain with N ≥ 3, s∈ (0,1),\,λ∈R is a real parameter and 2* = 2NN - 2 denotes the critical Sobolev exponent. As an application of the derived global compactness result, we further study the existence of positive solution of the corresponding Coron-type problem (C. R. Acad. Sci. Paris S\'er I Math, 299(7):209-212, 1984) when λ=0.

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