Algebraic Presentation of 4-Dimensional 2-Handlebodies and 3-Dimensional Cobordisms
Abstract
In this paper, we give a new direct proof of a result by Bobtcheva and Piergallini that provides finite algebraic presentations of two categories, denoted 3Cob and 4HB, whose morphisms are manifolds of dimension 3 and 4, respectively. More precisely, 3Cob is the category of connected oriented 3-dimensional cobordisms between connected surfaces with connected boundary, while 4HB is the category of connected oriented 4-dimensional 2-handlebodies up to 2-deformations. For this purpose, we explicitly construct the inverse of the functor : 4Alg 4HB, where 4Alg denotes the free monoidal category generated by a Bobtcheva--Piergallini Hopf algebra. As an application, we deduce an algebraic presentation of 3Cob and show that it is equivalent to the one conjectured by Habiro.
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