Annular Khovanov homology and knotted Schur-Weyl representations

Autor:	J. Elisenda Grigsby, Stephan M. Wehrli, Anthony Licata
Jazyk:	angličtina
Rok vydání:	2015
Předmět:	Khovanov homology Pure mathematics Current algebra Duality (optimization) 01 natural sciences Mathematics - Geometric Topology Symmetric group Mathematics::Quantum Algebra 0103 physical sciences Mathematics - Quantum Algebra FOS: Mathematics Quantum Algebra (math.QA) 57M27 81R50 20F36 Representation Theory (math.RT) 0101 mathematics Link (knot theory) Unknot Mathematics::Representation Theory Mathematics::Symplectic Geometry Mathematics Algebra and Number Theory 010102 general mathematics Geometric Topology (math.GT) Annulus (mathematics) Mathematics::Geometric Topology 010307 mathematical physics Mathematics - Representation Theory Knot (mathematics)
Popis:	Let L be a link in a thickened annulus. We show that its sutured annular Khovanov homology carries an action of the exterior current algebra of the Lie algebra sl_2. When L is an m-framed n-cable of a knot K in the three-sphere, its sutured annular Khovanov homology carries a commuting action of the symmetric group S_n. One therefore obtains a "knotted" Schur-Weyl representation that agrees with classical sl_2 Schur-Weyl duality when K is the Seifert-framed unknot. 38 pages, 8 figures
Databáze:	OpenAIRE
Externí odkaz:	https://explore.openaire.eu/search/publication?articleId=doi_dedup___::c87483527047316f6a27b2d567420edd http://arxiv.org/abs/1505.04386 Zobrazit plný text záznamu