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Main Authors: Camacho-Cadena, Fernando, Farre, James, Wienhard, Anna
Format: Preprint
Published: 2024
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Online Access:https://arxiv.org/abs/2410.05154
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author Camacho-Cadena, Fernando
Farre, James
Wienhard, Anna
author_facet Camacho-Cadena, Fernando
Farre, James
Wienhard, Anna
contents Goldman defined a symplectic form on the smooth locus of the $G$-character variety of a closed, oriented surface $S$ for a Lie group $G$ satisfying very general hypotheses. He then studied the Hamiltonian flows associated to $G$-invariant functions $G \to \mathbb R$ obtained by evaluation on a simple closed curve and proved that they are generalized twist flows. In this article, we investigate the Hamiltonian flows on (subsets of the) $G$-character variety induced by evaluating a $G$-invariant multi-function $G^k \to \mathbb R$ on a tuple $ \underlineα \in π_1(S)^k$. We introduce the notion of a subsurface deformation along a supporting subsurface $S_0$ for $\underlineα$ and prove that the Hamiltonian flow of an induced invariant multi-function is of this type. We also give a formula for the Poisson bracket between two functions induced by invariant multi-functions and prove that they Poisson commute if their supporting subsurfaces are disjoint. We give many examples of functions on character varieties that arise in this way and discuss applications, for example, to the flow associated to the trace function for non-simple closed curves on $S$.
format Preprint
id arxiv_https___arxiv_org_abs_2410_05154
institution arXiv
publishDate 2024
record_format arxiv
spellingShingle Invariant multi-functions and Hamiltonian flows for surface group representations
Camacho-Cadena, Fernando
Farre, James
Wienhard, Anna
Geometric Topology
Goldman defined a symplectic form on the smooth locus of the $G$-character variety of a closed, oriented surface $S$ for a Lie group $G$ satisfying very general hypotheses. He then studied the Hamiltonian flows associated to $G$-invariant functions $G \to \mathbb R$ obtained by evaluation on a simple closed curve and proved that they are generalized twist flows. In this article, we investigate the Hamiltonian flows on (subsets of the) $G$-character variety induced by evaluating a $G$-invariant multi-function $G^k \to \mathbb R$ on a tuple $ \underlineα \in π_1(S)^k$. We introduce the notion of a subsurface deformation along a supporting subsurface $S_0$ for $\underlineα$ and prove that the Hamiltonian flow of an induced invariant multi-function is of this type. We also give a formula for the Poisson bracket between two functions induced by invariant multi-functions and prove that they Poisson commute if their supporting subsurfaces are disjoint. We give many examples of functions on character varieties that arise in this way and discuss applications, for example, to the flow associated to the trace function for non-simple closed curves on $S$.
title Invariant multi-functions and Hamiltonian flows for surface group representations
topic Geometric Topology
url https://arxiv.org/abs/2410.05154