论文信息 - Geometric and integrability properties of Kahan’s method: the preservation of certain quadratic integrals

Geometric and integrability properties of Kahan’s method: the preservation of certain quadratic integrals

Given a quadratic vector field on \mathbb{R}^n possessing a quadratic first integral depending on two of the independent variables, we give a constructive proof that Kahan's discretization method exactly preserves a nearby modifed integral. Building on this result, we present a family of integrable quadratic vector fields (including the Euler top) whose Kahan discretization is a novel 10-parameter family of integrable maps.

[1] E. Hairer,et al. Geometric Numerical Integration: Structure Preserving Algorithms for Ordinary Differential Equations , 2004 .

[2] Apostolos Iatrou. Three Dimensional Integrable Mappings , 2003 .

[3] G. R. W. Quispel,et al. Interchanging parameters and integrals in dynamical systems: the mapping case , 2002 .

[4] Kinji Kimura,et al. How to find the conserved quantities of nonlinear discrete equations , 2001 .

[5] Elena Celledoni,et al. Integrability properties of Kahanʼs method , 2014, 1405.3740.

[6] Kinji Kimura,et al. Discretization of the Lagrange Top , 2000 .

[7] Matteo Petrera,et al. On integrability of Hirota-Kimura type discretizations , 2010, 1008.1040.

[8] Elena Celledoni,et al. Geometric properties of Kahan's method , 2012, 1209.1164.

[9] Kinji Kimura,et al. Discretization of the Euler top , 2000 .