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Интеллектуальная Система Тематического Исследования НАукометрических данных |
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Let us consider a standard billiard problem in some fixed domain. A particle moves in a straight line within the domain. When the particle hits the boundary it reflects from it without velocity loss. This dynamic system contains the first integral - the scalar square of the velocity vector. In some special cases such a system has an another integral. One of these cases is a billiard in the domain bounded by confocal quadrics. The second special integral can be described by the following feature of trajectories: the straight lines containing the segments of the polygonal billiard trajectory are tangents to a certain quadric (ellipse or hyperbola). This dynamical system has 4-dimensional phase space and two integrals. One of them is a Hamiltonian. Integrable Hamiltonian systems with 2 degrees of freedom have Fomenko-Zieschang invariants. Such invariants allow us to speak about the equivalence between closures of trajectories - Liouville equivalence. Up to Liouville equivalence, such systems have been studied in details by V.Dragovich, M.Radnovich and V.V.Fokicheva. A billiard's book is a generalization of these billiards. Such type of billiards formed by gluing a few classical billiard domains along pieces of their boundaries. The special case where we glue two domains called a topological billiard and was researched by V.V. Fokicheva. Researching billiard's books we try model famous integrable systems in terms of Fomenko-Zieschang invariants. The Fomenko conjecture about modeling Fomenko-Zieschang invariants using billiard's books and new results that confirm the part of the conjecture will be presented.
№ | Имя | Описание | Имя файла | Размер | Добавлен |
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1. | Краткий текст | Billiards_Book.pdf | 51,4 КБ | 7 сентября 2018 [Kharcheva] |