Polylinear Differential Realization of Deterministic Dynamic Chaos in the Class of Higher Order Equations with Delay

IF 0.5 Q3 MATHEMATICS
A. V. Banshchikov, A. V. Lakeev, V. A. Rusanov
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引用次数: 0

Abstract

A characteristic criterion (and its modifications) of the solvability of differential realization of the bundle of controlled trajectory curves of deterministic chaotic dynamic processes in the class of higher order bilinear nonautonomous ordinary differential equations (with and without delay) in the separable Hilbert space has been found. This formulation refers to inverse problems for the additive combination of higher order nonstationary linear and bilinear operators of the evolution equation in the Hilbert space. This theory is based on constructs of tensor products of Hilbert spaces, structures of lattices with an orthocomplement, the theory of extension of M2 operators, and the functional apparatus of the Rayleigh–Ritz nonlinear entropy operator. It has been shown that, in the case of a finite bundle of controlled trajectory curves, the property of sublinearity of the given operator allows one to obtain sufficient conditions for the existence of such realizations. The results obtained in this study are partly of a review nature and can become the basis for the development (in terms of Fock spaces) of a qualitative theory of inverse problems of higher order polylinear evolution equations with generalized delay operators describing, for example, the modeling of nonlinear oscillators of the Van der Pol type or Lorentz strange attractors.

Abstract Image

带延迟的高阶方程中确定性动态混沌的多线性微分实现
摘要 在可分离的希尔伯特空间中的高阶双线性非自治常微分方程类(有延迟和无延迟)中,发现了确定性混沌动态过程的受控轨迹曲线束的微分实现的可解性特征准则(及其修正)。这一表述涉及希尔伯特空间中演化方程的高阶非稳态线性和双线性算子的加法组合逆问题。该理论基于希尔伯特空间的张量积、具有正补的网格结构、M2 算子的扩展理论以及雷利-里兹非线性熵算子的函数装置。研究表明,在受控轨迹曲线有限束的情况下,给定算子的亚线性性质允许我们获得此类实现存在的充分条件。本研究获得的结果部分是回顾性的,可以成为(在福克空间方面)发展具有广义延迟算子的高阶多线性演化方程逆问题定性理论的基础,例如,描述范德波尔类型的非线性振荡器或洛伦兹奇异吸引子的模型。
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来源期刊
Russian Mathematics
Russian Mathematics MATHEMATICS-
CiteScore
0.90
自引率
25.00%
发文量
0
期刊介绍: Russian Mathematics  is a peer reviewed periodical that encompasses the most significant research in both pure and applied mathematics.
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