Concentration-compactness principle for nonlocal scalar field equations with critical growth
Abstract
The aim of this paper is to study a concentration-compactness principle for homogeneous fractional Sobolev space Ds,2 (RN) for 0<s<\1,N/2\. As an application we establish Palais-Smale compactness for the Lagrangian associated to the fractional scalar field equation (-)s u = f(x,u) for 0<s<1. Moreover, using an analytic framework based on Ds,2(RN), we obtain the existence of ground state solutions for a wide class of nonlinearities in the critical growth range.
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