In this talk, we introduce a multi-symplectic quasi-interpolation method for solving multi-symplectic Hamiltonian partial differential equations. Based on the method of lines, we first discretize the multi-symplectic PDEs using quasi-interpolation method and then employ appropriate time integrators to obtain the full-discrete system. The local conservation properties including multi-symplectic conservation laws, energy conservation laws and momentum conservation laws are discussed in detail. For illustration, we provide two concrete examples: the nonlinear wave equation and the nonlinear Schrödinger equation.The salient feature of our multi-symplectic quasi-interpolation method is that it is validboth on uniform grids and nonuniform grids. The numerical results show the good accuracy and excellent conservation properties of the proposed method.

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