Tracy Chin, University of Washington
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PDL C-401 and via Zoom Link: https://washington.zoom.us/j/91547335974
Abstract:
Delta matroids are a generalization of matroids that arise naturally from combinatorial objects such as matchings on graphs and principal minors of symmetric and skew symmetric matrices. In this talk, we will define valuated delta matroids and explore their connection with principal minors of Hermitian matrices. This generalizes work by Rincón on valuated even delta matroids and skew symmetric matrices. Based on joint work with Nathan Cheung, Gaku Liu, and Cynthia Vinzant.
Note: This talk begins with a pre-seminar (aimed at graduate students) at 3:30–4:00. The main talk starts at 4:10.
Join Zoom Meeting: https://washington.zoom.us/j/
Meeting ID: 915 4733 5974