POSITIVE EIGENFUNCTIONS OF A CLASS OF FRACTIONAL SCHRODINGER OPERATOR WITH A POTENTIAL WELL

In this paper, we are concerned with the following eigenvalue problem (-Delta)(s) u + lambda g(x) u = alpha u, u is an element of H-s (R-N), N >= 3, where s is an element of (0,1), alpha, lambda is an element of R and g(x) 0 on (Omega) over bar, g (x) is an element of (0, 1] on R-N\(Omega) over bar and lim(vertical bar x vertical bar ->infinity) g (x) = 1 for some bounded open set Omega subset of R-N. We discuss the existence and some properties of the first two eigenvalues for this problem, which extend some classical results for semilinear Schrodinger equations to the nonlocal fractional setting.