Existence of homoclinic solution in first order discrete Hamiltonian system
Abstract
In this paper we consider the first order discrete Hamiltonian system cases x1(n+1)-x1(n)& =- Hx2(n,x(n)), x2(n)-x2(n-1)& =\ \ Hx1(n,x(n)). cases Where n∈ Z, x(n)= x1 (n) x2 (n) ∈ R2N, H(n,z)= 12S(n)z· z + R(n,z) is periodic in n and asymptotically quadratic as |z| ∞. We will prove the existence of homoclonic solution by critical point theorem for strongly indefinite functional.
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