cw -配合物的膜拓扑场论和Hurwitz数

Topology and Geometry Pub Date : 2009-04-01 DOI:10.4171/irma/33-1/13

S. Natanzon

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引用次数: 1

摘要

本文在一些特殊的膜配合物上扩展了拓扑场理论。这种膜拓扑场论一对一地对应于无限维Frobenius代数，由较小维数的cw -配合物分度。定义了膜配合物的一般和正则Hurwitz数，并证明了它们产生了膜拓扑场论。对于一般的Hurwitz数，对应代数是一种小维数覆盖的代数。对于正则Hurwitz数，Frobenius代数是有限群的子群族的代数。

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Brane Topological Field Theory and Hurwitz numbers for CW-complexes

We expand Topological Field Theory on some special CW-complexes (brane complexes). This Brane Topological Field Theory one-to-one corresponds to infinite dimensional Frobenius Algebras, graduated by CW-complexes of lesser dimension. We define general and regular Hurwitz numbers of brane complexes and prove that they generate Brane Topological Field Theories. For general Hurwitz numbers corresponding algebra is an algebra of coverings of lesser dimension. For regular Hurwitz numbers the Frobenius algebra is an algebra of families of subgroups of finite groups.

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Topology and Geometry

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