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An Introduction to the Volume Conjecture

2 Pith papers cite this work. Polarity classification is still indexing.

2 Pith papers citing it
abstract

This is an introduction to the Volume Conjecture and its generalizations for nonexperts. The Volume Conjecture states that a certain limit of the colored Jones polynomial of a knot would give the volume of its complement. If we deform the parameter of the colored Jones polynomial we also conjecture that it would also give the volume and the Chern-Simons invariant of a three-manifold obtained by Dehn surgery determined by the parameter. I start with a definition of the colored Jones polynomial and include elementary examples and short description of elementary hyperbolic geometry.

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2026 1 2021 1

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UNVERDICTED 2

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Resurgence of Chern-Simons theory at the trivial flat connection

math.GT · 2021-11-08 · unverdicted · novelty 8.0

An extended square matrix of (x,q)-series indexed by boundary parabolic SL2(C) flat connections completely describes the resurgent structure, Stokes constants, and Borel transform of Chern-Simons perturbation theory at the trivial flat connection for hyperbolic knot complements.

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  • Resurgence of Chern-Simons theory at the trivial flat connection math.GT · 2021-11-08 · unverdicted · none · ref 46 · internal anchor

    An extended square matrix of (x,q)-series indexed by boundary parabolic SL2(C) flat connections completely describes the resurgent structure, Stokes constants, and Borel transform of Chern-Simons perturbation theory at the trivial flat connection for hyperbolic knot complements.

  • Generalized Minkowski Theorem for Tetrahedra in ${\rm dS}^3$ and ${\rm AdS}^3$ math-ph · 2026-05-26 · unverdicted · none · ref 43 · internal anchor

    Four based SO+(1,2) holonomies reconstruct a unique strictly convex tetrahedron in dS^3 or AdS^3, with det G selecting the model and recovering Euclidean cases via SU(2).