Existence and concentration of solution for a fractional Hamiltonian systems with positive semi-definite matrix

Abstract

We study the existence of solutions for the following fractional Hamiltonian systems \ arrayll - tDα∞(-∞Dαtu(t))-λ L(t)u(t)+∇ W(t,u(t))=0,\\[0.1cm] u∈ Hα(R,Rn), array . (FHS)λ where α∈ (1/2,1), t∈ R, u∈ Rn, λ>0 is a parameter, L∈ C(R,Rn2) is a symmetric matrix for all t∈ R, W∈ C1(R × Rn,R). Assuming that L(t) is a positive semi-definite symmetric matrix for all t∈ R, that is, L(t) 0 is allowed to occur in some finite interval T of R, W(t,u) satisfies some superquadratic conditions weaker than Ambrosetti-Rabinowitz condition, we show that (FHS)λ has a solution which vanishes on R T as λ ∞, and converges to some u∈ Hα(, n). Here, u∈ E0α is a solution of the Dirichlet BVP for fractional systems on the finite interval T. Our results are new and improve recent results in the literature even in the case α =1.