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V. A. Rohlin St. Petersburg Topology Seminar
May 17, 2021 19:00–21:00, St. Petersburg, POMI, room 311 (27 Fontanka)
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A survey of Bar-Natan skein theory
U. Kaiser Boise State University
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Abstract:
Bar-Natan skein modules have been introduced by Bar-Natan in his approach
to Khovanov homology. In his case these are quotients of abelian groups
generated by surfaces, with components possibly carrying dots, by a set of
certain surgery induced relations. These modules have been generalized by
Asaeda and Frohman to a setting of dotted surfaces embedded in compact
3-manifolds. I will discuss a general definition of Bar-Natan modules for
surfaces embedded in compact 3-manifolds, with the components colored by
elements of an arbitrary commutative Frobenius algebra (with the dot case
corresponding to x in Z[x]/(x^2)). This construction defines in fact a full
extension of the 2-dimensional TQFT corresponding to the Frobenius algebra.
Then I will show that each commutative Frobenius algebra defines a natural
category of algebras. Moreover, for each compact 3-manifold with a closed
1-manifold in its boundary, there is a compression body category defined by
Casson and Gordon. We will
define a functor from the compression body category into this category of
algebras, such that the colimit of this functor is the Bar-Natan module.
This new type of categorification leads to a good understanding of how the
topology of the 3-manifold is reflected in the modules and to presentations
in terms of incompressible surfaces (in the dotted case already observed by
Asaeda and Frohman). There is a bicategory version of this result, an
orientable and an oriented version, and functors relating these structures.
If time permits I will also discuss the definition and some results and
questions for a skein module combining Bar-Natan skein modules with the
Kauffman bracket skein module.
Zoom 875 9016 0151, the usual password (ask V. M. Nezhinskij: nezhin@pdmi.ras.ru).
Language: English
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