A fractional Kirchhoff problem involving a singular term and a critical nonlinearity

Abstract

In this paper we consider the following critical nonlocal problem \arrayll M(R2N|u(x)-u(y)|2|x-y|N+2sdxdy)(-)s u = λuγ+u2*s-1&in ,\\ u>0&in ,\\ u=0&in RN, array. where is an open bounded subset of RN with continuous boundary, dimension N>2s with parameter s∈ (0,1), 2*s=2N/(N-2s) is the fractional critical Sobolev exponent, λ>0 is a real parameter, exponent γ∈(0,1), M models a Kirchhoff type coefficient, while (-)s is the fractional Laplace operator. In particular, we cover the delicate degenerate case, that is when the Kirchhoff function M is zero at zero. By combining variational methods with an appropriate truncation argument, we provide the existence of two solutions.