In this paper, we mainly consider the existence of infinitely many homoclinicsolutions for a class of subquadratic second-order Hamiltonian systems$\ddot{u}-L(t)u+W_u(t,u)=0$, where $L(t)$ is not necessarily positive definiteand the growth rate of potential function $W$ can be in $(1,3/2)$. Using thevariant fountain theorem, we obtain the existence of infinitely many homoclinicsolutions for the second-order Hamiltonian systems.
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