A computer-assisted proof of dynamo growth in the stretch-fold-shear map

IF 0.5 4区 数学 Q4 MATHEMATICS, APPLIED Dynamical Systems-An International Journal Pub Date : 2022-12-17 DOI:10.1080/14689367.2022.2139224
Farhana Akond Pramy, Ben Mestel, Robert Hasson, Katrine Rogers
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Abstract

The Stretch-Fold-Shear (SFS) operator is a functional linear operator acting on complex-valued functions of a real variable x on some domain containing in It arises from a stylized model in kinematic dynamo theory where magnetic field growth corresponds to an eigenvalue of modulus greater than 1. When the shear parameter α is zero, the spectrum of can be determined exactly, and the eigenfunctions corresponding to non-zero eigenvalues are related to the Bernoulli polynomials. The spectrum for has not been rigorously determined although the spectrum has been approximated numerically. In this paper, a computer-assisted proof is presented to provide rigorous bounds on the leading eigenvalue for , showing inter alia that has an eigenvalue of modulus greater than 1 for all α satisfying , thereby partially confirming an outstanding conjecture on the SFS operator.
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拉伸-褶皱-剪切图中发电机生长的计算机辅助证明
拉伸-折叠-剪切(SFS)算子是一种函数线性算子,作用于包含在中的某个域上的实变量x的复值函数。它源于运动学发电机理论中的一个程式化模型,其中磁场增长对应于大于1的模量本征值。当剪切参数α为零时,可以精确地确定的谱,并且与非零本征值相对应的本征函数与伯努利多项式有关。的频谱尚未严格确定,尽管该频谱已在数值上近似。在本文中,提出了一个计算机辅助证明,为的前导特征值提供了严格的边界,特别表明对于所有α满足,其特征值的模大于1,从而部分证实了关于SFS算子的一个突出猜想。
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来源期刊
CiteScore
0.90
自引率
0.00%
发文量
33
审稿时长
>12 weeks
期刊介绍: Dynamical Systems: An International Journal is a world-leading journal acting as a forum for communication across all branches of modern dynamical systems, and especially as a platform to facilitate interaction between theory and applications. This journal publishes high quality research articles in the theory and applications of dynamical systems, especially (but not exclusively) nonlinear systems. Advances in the following topics are addressed by the journal: •Differential equations •Bifurcation theory •Hamiltonian and Lagrangian dynamics •Hyperbolic dynamics •Ergodic theory •Topological and smooth dynamics •Random dynamical systems •Applications in technology, engineering and natural and life sciences
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