Authors: | Stošić, Marko Wedrich, Paul |
Affiliations: | Mathematics Mathematical Institute of the Serbian Academy of Sciences and Arts |
Title: | Tangle addition and the knots-quivers correspondence | Journal: | Journal of the London Mathematical Society | Issue Date: | 18-Jan-2021 | Rank: | ~M21 | ISSN: | 0024-6107 | DOI: | 10.1112/jlms.12433 | Abstract: | We prove that the generating functions for the one row/column colored HOMFLY-PT invariants of arborescent links are specializations of the generating functions of the motivic Donaldson–Thomas invariants of appropriate quivers that we naturally associate with these links. Our approach extends the previously established tangles-quivers correspondence for rational tangles to algebraic tangles by developing gluing formulas for HOMFLY-PT skein generating functions under Conway's tangle addition. As a consequence, we prove the conjectural links-quivers correspondence of Kucharski–Reineke–Stošić–Sułkowski for all arborescent links. |
Keywords: | 16G20 | 57M25 (primary); Mathematics - Quantum Algebra; Mathematics - Quantum Algebra; High Energy Physics - Theory; Mathematics - Representation Theory | Publisher: | London Mathematical Society |
Show full item record
SCOPUSTM
Citations
7
checked on Dec 20, 2024
Page view(s)
19
checked on Dec 22, 2024
Google ScholarTM
Check
Altmetric
Altmetric
Items in DSpace are protected by copyright, with all rights reserved, unless otherwise indicated.