On the n-loop Kontsevich invariant of knots having the same Alexander polynomial
Abstract
The n-loop Kontsevich invariant of knots takes its value in the completion of the space of n-loop open Jacobi diagrams, which is an infinite dimensional vector space. Since the 1-loop part is presented by the Alexander polynomial, we are interested in the image of the ≥ 2-loop Kontsevich invariant of knots having the same Alexander polynomial. In this paper, we show that for n≥ 2 the subspace generated by the image of the n-loop Kontsevich invariant of genus ≤ g knots having the same Alexander polynomial is finite dimensional. Further, we give some concrete calculations about those subspaces and dimensions in several simple cases.
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