Surgery formulae for finite type invariants of rational homology 3--spheres
Abstract
We first present three graphic surgery formulae for the degree n part Zn of the Kontsevich-Kuperberg-Thurston universal finite type invariant of rational homology spheres. Each of these three formulae determines an alternate sum of the form ΣI ⊂ N (-1) IZn(MI) where N is the set of components of a framed algebraically split link L in a rational homology sphere M, and MI denotes the manifold resulting from the Dehn surgeries on the components of I. The first formula treats the case when L is a boundary link with n components, while the second one is for 3n--component algebraically split links. In the third formula, the link L has 2n components and the Milnor triple linking numbers of its 3--component sublinks vanish. The presented formulae are then applied to the study of the variation of Zn under a p/q-surgery on a knot K. This variation is a degree n polynomial in q/p when the class of q/p in / is fixed, and the coefficients of these polynomials are knot invariants, for which various topological properties or topological definitions are given.
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