KASHAEV'S INVARIANT AND THE VOLUME OF A HYPERBOLIC KNOT AFTER Y. YOKOTA

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DOI10.1142/9789812810199_0008zbMath0983.57012arXivmath/0008027OpenAlexW2076554501MaRDI QIDQ2751978

Hitoshi Murakami

Publication date: 19 April 2002

Published in: Physics and Combinatorics (Search for Journal in Brave)

Full work available at URL: https://arxiv.org/abs/math/0008027

zbMATH Keywords

hyperbolic knot hyperbolic volume knot invariant link invariant polyhedral decomposition

Mathematics Subject Classification ID

Lua error in Module:PublicationMSCList at line 37: attempt to index local 'msc_result' (a nil value).

Related Items (8)

Octahedral developing of knot complement. I: Pseudo-hyperbolic structure ⋮ The complex volumes of twist knots ⋮ 3-manifolds efficiently bound 4-manifolds ⋮ THE COLORED JONES POLYNOMIALS OF 2-BRIDGE LINK AND HYPERBOLICITY EQUATIONS OF IT'S COMPLEMENTS ⋮ Bipyramids and bounds on volumes of hyperbolic links ⋮ TRIPLE CROSSING NUMBER OF KNOTS AND LINKS ⋮ ASYMPTOTICS OF THE QUANTUM INVARIANTS FOR SURGERIES ON THE FIGURE 8 KNOT ⋮ The colored Jones polynomials as vortex partition functions

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