Skein Algebras of Three-Manifolds at 4th Roots of Unity

Abstract

This paper introduces an algebra structure on the part of the skein module of an arbitrary 3-manifold M spanned by links that represent 0 in H1(M;Z2) when the value of the parameter used in the Kauffman bracket skein relation is equal to i. It is proved that if M has no 2-torsion in H1(M;Z) then those algebras, K i0(M), are naturally isomorphic to the corresponding algebras when the value of the parameter is 1. This implies that the algebra K i0(M) is the unreduced coordinate ring of the variety of PSL2(C)-characters of π1(M) that lift to SL2(C)-representations.

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