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Quantization of Bending Deformations of Polygons In , Hypergeometric Integrals and the Gassner Representation

Published online by Cambridge University Press:  20 November 2018

Michael Kapovich
Affiliation:
Department of Mathematics University of Utah Salt Lake City, Utah 84112 USA, email: [email protected]
John J. Millson
Affiliation:
Department of Mathematics University of Maryland College Park, Maryland 20742 USA, email: [email protected]
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Abstract

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The Hamiltonian potentials of the bending deformations of $n$-gons in ${{\mathbb{E}}^{3}}$ studied in $\left[ \text{KM} \right]$ and [Kly] give rise to a Hamiltonian action of the Malcev Lie algebra ${{P}_{n}}$ of the pure braid group ${{P}_{n}}$ on the moduli space ${{M}_{r}}$ of $n$-gon linkages with the side-lengths $r\,=\,\left( {{r}_{1}},\ldots ,{{r}_{n}} \right)$ in ${{\mathbb{E}}^{3}}$. If $e\,\in \,{{M}_{r}}$ is a singular point we may linearize the vector fields in ${{P}_{n}}$ at $e$. This linearization yields a flat connection $\nabla$ on the space $\mathbb{C}_{*}^{n}$ of $n$ distinct points on $\mathbb{C}$. We show that the monodromy of $\nabla$ is the dual of a quotient of a specialized reduced Gassner representation.

Keywords

Type
Research Article
Copyright
Copyright © Canadian Mathematical Society 2001

References

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