LEAST ENERGY SOLUTIONS FOR FRACTIONAL KIRCHHOFF TYPE EQUATIONS INVOLVING CRITICAL GROWTH

We study the following fractional Kirchhoff type equation: {(a + b integral(R3)vertical bar(-Delta)(s/2)u vertical bar(2)dx) (-Delta)(s)u + V(x)u = f(u) + vertical bar u vertical bar(2s)*(-2)u, x is an element of R-3, u is an element of H-s (R-3), where a, b > 0 are constants, 2(s)* = 6/3-2s with s is an element of (0, 1) is the critical Sobolev exponent in R-3, V is a potential function on R-3. Under some more general assumptions on f and V, we prove that the given problem admits a least energy solution by using a constrained minimization on Nehari-Pohozaev manifold and monotone method.