从一维内变形到多维赫农图谱:分叉结构的持续性

IF 1.9 4区 数学 Q2 MATHEMATICS, INTERDISCIPLINARY APPLICATIONS
V. N. Belykh, N. V. Barabash, D. A. Grechko
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引用次数: 0

摘要

著名的二维可逆 Hénon 映射在其前导参数 b 变为零时会变成一维不可逆二次映射。米拉对这一著名的联系进行了研究,证明了赫农衍射的分岔集与他的一维端射的 "盒中盒 "分岔结构相似。一般来说,这种相似性尚未得到严格证实,尤其是在多维情况下。在本文中,我们证明了当参数从零开始增大时,二次不可逆映射的米拉分岔结构依然存在,并且映射变成了可逆的多维广义赫农映射。描述了这一转变过程中周期轨道、同线轨道和混沌吸引子的变化。我们证明了纽豪斯区域的存在不同于那些累积到同线性分岔的米拉盒。
本文章由计算机程序翻译,如有差异,请以英文原文为准。
From 1D Endomorphism to Multidimensional Hénon Map: Persistence of Bifurcation Structure

The renowned 2D invertible Hénon map turns into 1D noninvertible quadratic map when its leading parameter b becomes zero. This well-known link was studied by Mira who demonstrated that the bifurcation set of Hénon diffeomorphism is similar to his “box-within-a-box” bifurcation structure of 1D endomorphism. In general, such similarity has not been strictly established, especially in multidimensional cases. In this paper, we proved that the Mira bifurcation structure of a quadratic noninvertible map persists when the parameter increases from zero and the map turns into an invertible multidimensional generalized Hénon map. The changes of periodic and homoclinic orbits and chaotic attractors at this transition are described. We proved the existence of Newhouse regions is different from those Mira boxes that accumulate to the homoclinic bifurcations.

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来源期刊
International Journal of Bifurcation and Chaos
International Journal of Bifurcation and Chaos 数学-数学跨学科应用
CiteScore
4.10
自引率
13.60%
发文量
237
审稿时长
2-4 weeks
期刊介绍: The International Journal of Bifurcation and Chaos is widely regarded as a leading journal in the exciting fields of chaos theory and nonlinear science. Represented by an international editorial board comprising top researchers from a wide variety of disciplines, it is setting high standards in scientific and production quality. The journal has been reputedly acclaimed by the scientific community around the world, and has featured many important papers by leading researchers from various areas of applied sciences and engineering. The discipline of chaos theory has created a universal paradigm, a scientific parlance, and a mathematical tool for grappling with complex dynamical phenomena. In every field of applied sciences (astronomy, atmospheric sciences, biology, chemistry, economics, geophysics, life and medical sciences, physics, social sciences, ecology, etc.) and engineering (aerospace, chemical, electronic, civil, computer, information, mechanical, software, telecommunication, etc.), the local and global manifestations of chaos and bifurcation have burst forth in an unprecedented universality, linking scientists heretofore unfamiliar with one another''s fields, and offering an opportunity to reshape our grasp of reality.
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