Abstract: An symplectic algorithm is presented for solving the Hamiltonian systems of the water-wave problem under long-wave approximation. Firstly, the generating function method is generalized to infinite-dimensional Hamiltonian systems, and then symplectic schemes are deduced directly from the Hamiltonian function of infinite-dimensional system, rather than from a Hamiltonian function of finite-dimensional approximate system. Finally, the spatial discretization of these schemes is used in simulation. Compared with the known results by un-symplectic algorithms, the numerical solutions by the symplectic algorithm are stable in long-time simulation. Compared with the traditional symplectic algorithm for solving infinite-dimensional systems, our algorithm is more efficient and more accurate.

Key words: symplectic algorithm, Hamiltonian system, water-wave problem, generating function method, long-wave approximation