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International Conference «Quantum Integrability and Geometry» Dedicated to 60th Anniversaries of N. A. Slavnov and L. O. Chekhov
June 2, 2022 12:30–13:10, Steklov Mathematical Institute, Conference hall (9th floor) + Zoom
 


Skew characteristic polynomial of graphs and embedded graphs

S. K. Landoab

a National Research University "Higher School of Economics", Moscow
b Skolkovo Institute of Science and Technology
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S. K. Lando
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Abstract: We introduce a new one-variable polynomial invariant of graphs, which we call the skew characteristic polynomial. For an oriented simple graph, this is just the characteristic polynomial of its anti-symmetric adjacency matrix. For nonoriented simple graphs the definition is different, but for a certain class of graphs (namely, for intersection graphs of chord diagrams), it gives the same answer if we endow such a graph with an orientation induced by the chord diagram.
We prove that this invariant satisfies Vassiliev's 4-term relations and determines therefore a finite type knot invariant. We investigate the behaviour of the polynomial with respect to the Hopf algebra structure on the space of graphs and show that it takes a constant value on any primitive element in this Hopf algebra. We also provide a two-variable extension of the skew characteristic polynomial to embedded graphs and delta-matroids. The 4-term relations for the extended polynomial prove that it determines a finite type invariant of multicomponent links.
The talk is based on a joint work with R.Dogra.

Language: English
 
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