SO(3) invariants of Seifert manifolds and their algebraic integrality
Abstract
For Seifert manifold $M=X({p_1}/_{\f{q_1}},{p_2}/_{\f{q_2}}, ...,{p_n}/_ {\f{q_n}}), \tau^{'}_r(M)$ is calculated for all $r$ odd $\geq 3$. If $r$ is coprime to at least $n-2$ of $p_k$ (e.g. when $M$ is the Poincare homology sphere), it is proved that $(\sqrt {\dfrac{4}{r}}\sin \dfrac{\pi}{r})^{\nu}\tau^{'}_r(M)$ is an algebraic integer in the r-th cyclotomic field, where $\nu$ is the first Betti number of $M$. For the torus bundle obtained from trefoil knot with framing 0, i.e. $X_{tref}(0)=X(-2/_{\f{1}},3/_{\f{1}},6/_{\f{1}}), \tau^{'}_r$ is obtained in a simple form if $3\mid\llap /r$, which shows in some sense that it is impossible to generalize Ohtsuki's invariant to 3-manifolds being not rational homology spheres.
- Publication:
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arXiv Mathematics e-prints
- Pub Date:
- May 2000
- DOI:
- 10.48550/arXiv.math/0005298
- arXiv:
- arXiv:math/0005298
- Bibcode:
- 2000math......5298L
- Keywords:
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- Quantum Algebra;
- Geometric Topology;
- Mathematical Physics
- E-Print:
- Latex