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Дифференциальные операторы на сингулярных пространствах, алгебраически интегрируемые системы и квантование
24 апреля 2017 г., г. Москва, Главное здание МГУ им. М. В. Ломоносова, аудитория 13-24


Paths counting on simple graphs: from escape to localization

О. Вальба

Аннотация: We study the localization of trajectories on tree-like regular graphs with a special vertex at the origin which has a coordination number (root degree)different from those of other vertices. The singularity analysis of the respective partition function of all paths leads to the dependence of the critical root degree on the degree of other vertices. The same results can be received by studying the spectrum of the adjacency matrix of these graphs. We also ask the question whether one can expect localization in path counting problem on decorated star graphs, which are topologically very similar to star tree-like graph with one principal difference: all vertices of the decorated graph have the same vertex degree, being multiply linked to the neighbors.


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