Let V be a finite-dimensional complex vector space. A tuple (W_1, \dots, W_n) of subspaces of V is a spanning configuration if W_1 + ... + W_n = V as vector spaces. We present the cohomology of the moduli space of spanning configurations with a fixed dimension vector and describe a relationship between our work and the {\em Delta Conjecture} of symmetric function theory. Joint with Brendan Pawlowski. Speaker(s): Brendon Rhoades (UC San Diego)
| Building: | East Hall |
|---|---|
| Event Type: | Workshop / Seminar |
| Tags: | Mathematics |
| Source: | Happening @ Michigan from Department of Mathematics, Combinatorics Seminar - Department of Mathematics |
