修整链的可积化简

IF 1 Q3 Engineering

Journal of Computational Dynamics Pub Date : 2019-03-07 DOI:10.3934/jcd.2019014

C. Evripidou, P. Kassotakis, P. Vanhaecke

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引用次数: 6

摘要

本文以Lotka-Volterra形式构造了修整链的可积约简族。对于每个$k,n\in\mathbb N$和$n\geqslant 2k+1$，我们得到一个Lotka-Volterra系统$\hbox{LV}_b(n,k)$在$\mathbb R^n$上，它是Lotka-Volterra系统$\hbox{LV}(n,k)$的变形，它本身是$m$维Bogoyavlenskij-Itoh系统$\hbox{LV}(2m+1,m)$的可积化简，其中$m=n-k-1$。我们证明了$\hbox{LV}_b(n,k)$既是刘维尔可积的，也是非交换可积的，它的有理第一积分是$\hbox{LV}(n,k)$的有理积分的变形。我们还构造了$\hbox{LV}_b(n,0)$的离散化族，包括它的Kahan离散化，并证明了这些离散化也是Liouville和超可积的。

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Integrable reductions of the dressing chain

In this paper we construct a family of integrable reductions of the dressing chain, described in its Lotka-Volterra form. For each $k,n\in\mathbb N$ with $n\geqslant 2k+1$ we obtain a Lotka-Volterra system $\hbox{LV}_b(n,k)$ on $\mathbb R^n$ which is a deformation of the Lotka-Volterra system $\hbox{LV}(n,k)$, which is itself an integrable reduction of the $m$-dimensional Bogoyavlenskij-Itoh system $\hbox{LV}(2m+1,m)$, where $m=n-k-1$. We prove that $\hbox{LV}_b(n,k)$ is both Liouville and non-commutative integrable, with rational first integrals which are deformations of the rational integrals of $\hbox{LV}(n,k)$. We also construct a family of discretizations of $\hbox{LV}_b(n,0)$, including its Kahan discretization, and we show that these discretizations are also Liouville and superintegrable.

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来源期刊

Journal of Computational Dynamics Engineering-Computational Mechanics

CiteScore

2.30

自引率

10.00%

发文量

期刊介绍： JCD is focused on the intersection of computation with deterministic and stochastic dynamics. The mission of the journal is to publish papers that explore new computational methods for analyzing dynamic problems or use novel dynamical methods to improve computation. The subject matter of JCD includes both fundamental mathematical contributions and applications to problems from science and engineering. A non-exhaustive list of topics includes * Computation of phase-space structures and bifurcations * Multi-time-scale methods * Structure-preserving integration * Nonlinear and stochastic model reduction * Set-valued numerical techniques * Network and distributed dynamics JCD includes both original research and survey papers that give a detailed and illuminating treatment of an important area of current interest. The editorial board of JCD consists of world-leading researchers from mathematics, engineering, and science, all of whom are experts in both computational methods and the theory of dynamical systems.