ENERGY PRESERVING METHODS FOR VOLTERRA LATTICE EQUATION
ENERGY PRESERVING METHODS FOR VOLTERRA LATTICE EQUATION
Bulent Karasozen Ozge Erdem
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Abstract
We investigate linear energy preserving methods for the Volterra lattice equation as non-canonical Hamiltonian system. The averaged vector field method was applied to the Volterra lattice equation in bi-Hamiltonian form with quadratic and cubic Poisson brackets. Numerical results confirm the excellent long time preservation of the Hamiltonians and the polynomial integrals.
Keywords
Energy preserving integrators, Runge-Kutta methods, Bi-Hamiltonian systems, Poisson structure.