The Kontsevich integral for bottom tangles in handlebodies
Kazuo Habiro, Gwenael Massuyeau

TL;DR
This paper extends the Kontsevich integral to bottom tangles in handlebodies, constructing a functor that links topological objects with algebraic structures, and refines the LMO invariant within a TQFT framework.
Contribution
It introduces a functor from bottom tangles in handlebodies to Jacobi diagrams, establishing an isomorphism with the associated graded of the Vassiliev-Goussarov filtration, and connects Drinfeld associators to ribbon quasi-Hopf algebras.
Findings
Constructed a functor Z: o \u00a0 for bottom tangles in handlebodies.
Proved an isomorphism ext{ gr} e7 .
Linked Drinfeld associators to ribbon quasi-Hopf algebras in the graded setting.
Abstract
Using an extension of the Kontsevich integral to tangles in handlebodies similar to a construction given by Andersen, Mattes and Reshetikhin, we construct a functor , where is the category of bottom tangles in handlebodies and is the degree-completion of the category of Jacobi diagrams in handlebodies. As a symmetric monoidal linear category, is the linear PROP governing "Casimir Hopf algebras", which are cocommutative Hopf algebras equipped with a primitive invariant symmetric 2-tensor. The functor induces a canonical isomorphism , where is the associated graded of the Vassiliev-Goussarov filtration on . To each Drinfeld associator we associate a ribbon quasi-Hopf algebra in…
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