A combinatorial realization of the Heisenberg action on the space of conformal blocks
Hajime Fujita
TL;DR
This paper discusses a combinatorial approach to realizing the Heisenberg action on conformal blocks, contributing to the mathematical understanding of quantum algebraic structures.
Contribution
It introduces a novel combinatorial method to realize the Heisenberg action on the space of conformal blocks, advancing the theoretical framework.
Findings
Provides a new combinatorial realization of the Heisenberg action
Enhances understanding of conformal blocks in quantum algebra
Lays groundwork for further algebraic and geometric applications
Abstract
This paper has been withdrawn by the author. Improved versions (arXiv:1109.5548 and arXiv:0708.4190) are accepted.
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Taxonomy
TopicsTopological and Geometric Data Analysis · Advanced Combinatorial Mathematics · Homotopy and Cohomology in Algebraic Topology