Semi-classical Solutions For Fractional Schrodinger Equations With Potential Vanishing At Infinity

Abstract

We study the following fractional Schr\"odinger equation equationeq0.1 2s(-)s u + Vu = |u|p - 2u,\ \ x∈\,\,RN. equation We show that if the external potential V∈ C(RN;[0,∞)) has a local minimum and p∈ (2 + 2s/(N - 2s), 2*s), where 2*s=2N/(N-2s),\,N 2s, the problem has a family of solutions concentrating at the local minimum of V provided that |x| ∞V(x)|x|2s > 0. The proof is based on variational methods and penalized technique. Key words: fractional Schr\"odinger; vanishing potential; penalized technique; variational methods.