Kerler-Lyubashenko Functors on 4-Dimensional 2-Handlebodies

Abstract

We construct a braided monoidal functor J4 from Bobtcheva and Piergallini's category 4HB of connected 4-dimensional 2-handlebodies (up to 2-deformations) to an arbitrary unimodular ribbon category C, which is not required to be semisimple. The main example of target category is provided by H-mod, the category of left modules over a unimodular ribbon Hopf algebra H. The source category 4HB is freely generated, as a braided monoidal category, by a BPH algebra (short for Bobtcheva-Piergallini Hopf algebra), and this is sent by the Kerler-Lyubashenko functor J4 to the end ∫X ∈ C X X* in C, which is given by the adjoint representation in the case of H-mod. When C is factorizable, we show that the construction only depends on the boundary and signature of handlebodies, and thus projects to a functor J3σ defined on Kerler's category 3Cobσ of connected framed 3-dimensional cobordisms. When H* is not semisimple and H is not factorizable, our functor J4 has the potential of detecting diffeomorphisms that are not 2-deformations.