Dimension of the skein module of a Dehn filling

Abstract

Given a knot K and a generic slope r, we study the Kauffman bracket skein module (KBSM) S(EK (r) , Q (A)) of the Dehn filling EK (r) of slope r along K, assuming that the KBSM S(EK , Q [A 1]) of the exterior EK of K is finitely generated over S(∂ EK ,Q [A 1]). As shown in a paper of Thang L\e, this condition is satisfied for K a two-bridge knot. In this setting, we show that C (Sζ (EK (r))) = Q (A) (S (EK (r))) for almost all primitive roots of unity ζ of order 2N with N odd, and for almost all slopes r. When the character variety of a 3-manifold M is finite, we also discuss the decomposition of Sζ (M) in terms of localized skein modules. In particular, the dimension of the localized skein modules at a non-central point is the multiplicity of this point.

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