Quantum cyclotomic orders of 3-manifolds
arXiv:math/9809129
Abstract
This paper provides a topological interpretation for number theoretic properties of quantum invariants of 3-manifolds. In particular, it is shown that the p-adic valuation of the quantum SO(3)-invariant of a 3-manifold M, for odd primes p, is bounded below by a linear function of the mod p first betti number of M. Sharper bounds using more delicate topological invariants related to Massey products are given as well.
Final version for publication (to appear in Topology). Only minor changes from the first posted version