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Hauptverfasser: Audoux, Benjamin, Moussard, Delphine
Format: Preprint
Veröffentlicht: 2022
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Online-Zugang:https://arxiv.org/abs/2209.00473
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author Audoux, Benjamin
Moussard, Delphine
author_facet Audoux, Benjamin
Moussard, Delphine
contents An essential goal in the study of finite type invariants of some objects (knots, manifolds) is the construction of a universal finite type invariant, universal in the sense that it contains all finite type invariants of the given objects. Such a universal finite type invariant is known for knots in the 3-sphere -- the Kontsevich integral -- and for homology 3-spheres -- the Le-Murakami-Ohtsuki invariant. For knots in homology 3-spheres, an invariant constructed by Garoufalidis and Kricker as a lift of the Kontsevich integral has been considered for the last two decades as the best candidate to be a universal finite type invariant. Although this invariant is eventually universal in restriction to knots whose Alexander polynomial is trivial, we prove here that it is not powerful enough in general. For that we provide a refinement of its construction which produces a strictly stronger invariant, and we prove that this new invariant is a universal finite type invariant of knots in homology 3-spheres. This provides a full diagrammatic description of the graded space of finite type invariants of knots in homology 3-spheres.
format Preprint
id arxiv_https___arxiv_org_abs_2209_00473
institution arXiv
publishDate 2022
record_format arxiv
spellingShingle A universal finite type invariant of knots in homology 3-spheres
Audoux, Benjamin
Moussard, Delphine
Geometric Topology
57K16
An essential goal in the study of finite type invariants of some objects (knots, manifolds) is the construction of a universal finite type invariant, universal in the sense that it contains all finite type invariants of the given objects. Such a universal finite type invariant is known for knots in the 3-sphere -- the Kontsevich integral -- and for homology 3-spheres -- the Le-Murakami-Ohtsuki invariant. For knots in homology 3-spheres, an invariant constructed by Garoufalidis and Kricker as a lift of the Kontsevich integral has been considered for the last two decades as the best candidate to be a universal finite type invariant. Although this invariant is eventually universal in restriction to knots whose Alexander polynomial is trivial, we prove here that it is not powerful enough in general. For that we provide a refinement of its construction which produces a strictly stronger invariant, and we prove that this new invariant is a universal finite type invariant of knots in homology 3-spheres. This provides a full diagrammatic description of the graded space of finite type invariants of knots in homology 3-spheres.
title A universal finite type invariant of knots in homology 3-spheres
topic Geometric Topology
57K16
url https://arxiv.org/abs/2209.00473