Adjoint Reidemeister torsion of 3-manifolds with torus boundary for semisimple algebraic groups

Abstract

Let M be a compact oriented 3-manifold with boundary consisting of tori, and let G be a semisimple algebraic group. We define the adjoint torsion function on the moduli stack of G-local systems on M satisfying a certain regularity condition, extending the construction by Porti for G = SL2. When M is a cusped hyperbolic manifold, we prove that the local system associated with the image of the complete hyperbolic structure via a principal embedding PGL2 G satisfies the regularity condition. Moreover, we provide a formula expressing its adjoint torsion as a product of PGL2-torsions associated with the simple PGL2-modules with multiplicity given by the exponents of the Lie algebra of G. We compute the adjoint PGSp4-torsions of the figure-eight knot complement for two boundary-unipotent local systems, one is arising from the complete hyperbolic structure via a principal embedding, and the other is defined over a number field of degree 6 and not arising from any PGL2-local system via principal embeddings.