Multibump solutions of a class of second-order discrete Hamiltonian systems
Abstract
For a class of second-order discrete Hamiltonian systems 2x(t-1)-L(t)x(t)+V'x(t,x(t))=0, we investigate the existence of homoclinic orbits by applying variational method, where L and V(·,x) are periodic functions. Further, we show that there exist either uncountable many homoclinic orbits or multibump solutions under certain conditions.
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