Quantum Topology Seminar
Nilangshu Bhattacharyya
Louisiana State University
Lipschitz-Sarkar Stable Homotopy Type for Planar Trivalent Graph with Perfect Matchings.
Abstract: Lipschitz-Sarkar constructed Stable Homotopy Types for the Khovanov Homology of links in $S^3$. Following that, Kauffman-Nikonov-Ogasa found a family of Stable Homotopy types for the Homotopical Khovanov homology for links in thickened surfaces. Baldridge gave a cohomology theory which categorifies 2-factor polynomial of planar trivalent graphs with perfect matchings. In this talk, I will present on the construction of the Khovanov-Lipschitz-Sarkar stable Homotopy type for the Baldridge cohomology theory.
Thursday September 5, 2024 at 12:00 PM in Zoom