Skein valued curve counts for the topological vertex and knot conormals
CMSA EVENTS: CMSA MATHEMATICAL PHYSICS AND ALGEBRAIC GEOMETRY SEMINAR
When: November 21, 2024
10:30 am - 12:00 pm
Where: CMSA, 20 Garden St, G10
Address:
20 Garden Street, Cambridge, MA 02138, United States
Speaker: Tobias Ekholm (Uppsala University)
Combining the invariance of holomorphic curve counts in the skein module with a study of holomorphic curves at infinity of the vertex we find three simple skein operator polynomials that annihilates the (skein valued) topological vertex. We show that these operator polynomials together with natural initial conditions determine the partition function uniquely and then demonstrate that the original Aganagic-Klemm-Marino-Vafa formula for the topological vertex interpreted as a skein valued curve count satisfies the operator polynomials. This is joint work with Longhi and Shende. We end with a general discussion of similar ‘skein D-modules’ for knot conormals.
Zoom: https://harvard.zoom.us/j/98465186990?pwd=6bwz14zABuLCZm7WZnKnZ3aMzYz3q2.1
Password: CMSA