Exact Triangles for SO(3) Instanton Homology of Webs

Author(s)
Kronheimer, P. B.Mrowka, Tomasz S
Thumbnail
Download1508.07207.pdf (336.4Kb)
OPEN_ACCESS_POLICY
Terms of use
Creative Commons Attribution-Noncommercial-Share Alike http://creativecommons.org/licenses/by-nc-sa/4.0/
Metadata
Show full item record
Abstract
The SO(3) instanton homology recently introduced by the authors associates a finite-dimensional vector space over the field of two elements to every embedded trivalent graph (or "web"). The present paper establishes a skein exact triangle for this instanton homology, as well as a realization of the octahedral axiom. From the octahedral diagram, one can derive equivalent reformulations of the authors' conjecture that, for planar webs, the rank of the instanton homology is equal to the number of Tait colorings.
Date issued
2016-05
URI
http://hdl.handle.net/1721.1/116014
Department
Massachusetts Institute of Technology. Department of Mathematics
Journal
Journal of Topology
Publisher
Oxford University Press (OUP)
Citation
Kronheimer, P. B., and T. S. Mrowka. “Exact Triangles for SO(3) Instanton Homology of Webs.” Journal of Topology 9, 3 (May 2016): 774–796 © 2016 London Mathematical Society
Version: Original manuscript
ISSN
1753-8416
1753-8424
Collections