Wedge dislocations, three-dimensional gravity, and the Riemann-Hilbert problem

Katanaev M.O.; Mannanov I.G.

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Wedge dislocations, three-dimensional gravity, and the Riemann-Hilbert problem

机译：楔形脱位，三维重力和riemann-hilbert问题

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An expression for the free energy of an arbitrary static distribution of wedge dislocations in a solid is proposed. It represents a Euclidean version of (1+2)-dimensional gravity interacting with an arbitrary number of point particles. It is shown that the solution of the equilibrium equations leads to the Cauchy problem for effective equations determining the form of dislocations, while the problem of finding a metric leads to the Riemann-Hilbert problem for a frame with an O(3) monodromy representation.

机译：提出了一种在固体中楔形脱位的任意静态分布的自由能的表达。它代表了与任意数量的点粒子相互作用的（1 + 2） - 二维重力的欧几里德版本。结果表明，均衡方程的解决方案导致Cauchy问题，用于确定位错的形式的有效方程，而查找度量的问题导致具有O（3）单曲线表示的帧的Riemann-Hilbert问题。

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《Physics of particles and nuclei》 |2012年第5期|共5页
作者
Katanaev M.O.; Mannanov I.G.;
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Steklov Mathematical Institute Russian Academy of Sciences ul. Gubkina 8 Moscow 117966 Russian Federation;

Steklov Mathematical Institute Russian Academy of Sciences ul. Gubkina 8 Moscow 117966 Russian Federation;

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正文语种 eng
中图分类粒子物理学;
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机译：楔形脱位，三维重力和riemann-hilbert问题
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Wedge dislocations, three-dimensional gravity, and the Riemann-Hilbert problem

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