Algebraic properties of twisted Alexander polynomial and Reidemeister torsion of torus knots

Abstract

In this paper we prove that every coefficient of twisted Alexander polynomials of torus knots associated with irreducible SLn( C)-representations is an A-valued locally constant function on the SLn( C)-character variety, where A is the ring of all algebraic integers over C. Moreover, as a generalization of a recent result of Kitano and Nozaki, we show that SLn( C)-Reidemeister torsions are algebraic integers for many Seifert fibered spaces. Also, we discuss the power sums of Reidemeister torsions of torus knots for low-dimensional irreducible representations that provide a mysterious relation to TQFT.