An algebraic property of Reidemeister torsion

For a 3‐manifold M$M$ and an acyclic SL(2,C)$\mathit {SL}(2,\mathbb {C})$‐representation ρ$\rho$ of its fundamental group, the SL(2,C)$\mathit {SL}(2,\mathbb {C})$‐Reidemeister torsion τρ(M)∈C×$\tau _\rho (M) \in \mathbb {C}^\times$ is defined. If there are only finitely many conjugacy classes of ir...

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Bibliographic Details
Published inTransactions of the London Mathematical Society Vol. 9; no. 1; pp. 136 - 157
Main Authors Kitano, Teruaki, Nozaki, Yuta
Format Journal Article
LanguageEnglish
Published Oxford John Wiley & Sons, Inc 01.12.2022
Subjects
Algebra
Knots
Manifolds
Numbers
Representations
Toruses
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Summary:For a 3‐manifold M$M$ and an acyclic SL(2,C)$\mathit {SL}(2,\mathbb {C})$‐representation ρ$\rho$ of its fundamental group, the SL(2,C)$\mathit {SL}(2,\mathbb {C})$‐Reidemeister torsion τρ(M)∈C×$\tau _\rho (M) \in \mathbb {C}^\times$ is defined. If there are only finitely many conjugacy classes of irreducible representations, then the Reidemeister torsions are known to be algebraic numbers. Furthermore, we prove that the Reidemeister torsions are not only algebraic numbers but also algebraic integers for most Seifert fibered spaces and infinitely many hyperbolic 3‐manifolds. Also, for a knot exterior E(K)$E(K)$, we discuss the behavior of τρ(E(K))$\tau _\rho (E(K))$ when the restriction of ρ$\rho$ to the boundary torus is fixed.
ISSN:2052-4986
2052-4986
DOI:10.1112/tlm3.12049