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Webpage by: Tomasz Golinski
| XXXVII Workshop on Geometric Methods in Physics | 1-7.07.2018 |
| VII School on Geometry and Physics | 25-29.06.2018 |
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Gulgassyl NugmaovaAbout the interable two-layer sin system with self-consistent potential\documentclass[a4paper,12pt]{article} \usepackage{amsmath, amsfonts, amssymb} \usepackage[english]{babel} \textheight = 230mm \textwidth = 160mm \topmargin = -2mm \oddsidemargin=6mm \evensidemargin=6mm \makeindex \begin{document} \begin{center}\Large{\textbf{About the integrable two-layer spin systems with self-consistent potential}} \medskip \large{\textbf{Gulgassyl Nugmanova}}\\ \textit{ Eurasian National University, Astana, Kazakhstan}\\ \smallskip \textit{e-mail: nugmanovagn@gmail.com} \end{center} Integrable nonlinear differential equations admit soliton and other exact solutions. Study of soliton solutions and related solutions become on of the most active areas of research in the field of physics and mathematics. In this paper we present two-layer spin systems, which are generalization of the Landau-Lifshitz equation with self-consistent potential. We consider relations between two layers of spin, impact of self-consistent potential on these layers and their interactions on basic of differential geometry of curves. \end{document} |
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