arXiv:math/0512433 Abstract

arXiv:math/0512433 [math.GT]Abstract References Reviews Resources

Strong Integrality of Quantum Invariants of 3-manifolds

Published 2005-12-19, updated 2006-01-26Version 2

We prove that the quantum SO(3)-invariant of an arbitrary 3-manifold $M$ is always an algebraic integer, if the order of the quantum parameter is co-prime with the order of the torsion part of $H_1(M,\BZ)$. An even stronger integrality, known as cyclotomic integrality, was established by Habiro for integral homology 3-spheres. Here we generalize Habiro's result to all rational homology 3-spheres.

Comments: 19 pages. Minor typos corrected

Categories: math.GT, math.QA

Subjects: 57M25

Keywords: quantum invariants, strong integrality, generalize habiros result, algebraic integer, quantum parameter

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