FINITE TO INFINITE STEADY STATE SOLUTIONS, BIFURCATIONS OF AN INTEGRO-DIFFERENTIAL EQUAT]

Samir K. Bhowmik; Dugald B. Duncan; Michael Grinfeld; Gabriel J. Lord

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FINITE TO INFINITE STEADY STATE SOLUTIONS, BIFURCATIONS OF AN INTEGRO-DIFFERENTIAL EQUAT]

机译：稳态到无限稳态解，积分-微分方程的分叉]

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We consider a bistable integral equation which governs the stationary solutions of a convolution model of solid-solid phase transitions on a circle. We study the bifurcations of the set of the stationary solutions as the diffusion coefficient is increased to examine the transition from an uncountably infinite number of steady states to three for the continuum limit of the semi-discretised system. We show how the symmetry of the problem is responsible for the generation and stabilisation of equilibria and comment on the puzzling connection between continuity and stability that exists in this problem.

机译：我们考虑一个双稳态积分方程，该方程控制圆上固-固相变卷积模型的平稳解。随着扩散系数的增加，我们研究了一组固定解的分支，以检验从无穷多个稳态到半离散系统连续极限的三个过渡。我们展示了问题的对称性如何导致平衡的产生和稳定，并评论了该问题中存在的连续性和稳定性之间令人费解的联系。

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来源
《Discrete and continuous dynamical systems》 |2011年第1期|p.57-71|共15页
作者
Samir K. Bhowmik; Dugald B. Duncan; Michael Grinfeld; Gabriel J. Lord;
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作者单位

Department of Mathematics, University of Dhaka Dhaka 1000, Bangladesh;

Department of Mathematics and Maxwell Institute Heriot-Watt University Edinburgh, UK;

Department of Mathematics, University of Strathclyde Glasgow, UK;

Department of Mathematics and Maxwell Institute Heriot-Watt University Edinburgh, UK;

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正文语种 eng
中图分类
关键词
integro-differential equation; bifurcations; continuum limit; semi- discrete; regularity;

机译：积分微分方程分叉;连续极限半离散规律性;

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FINITE TO INFINITE STEADY STATE SOLUTIONS, BIFURCATIONS OF AN INTEGRO-DIFFERENTIAL EQUAT]

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