Vanishing of Schubert Coefficients
Abstract
Schubert coefficients are nonnegative integers cwu,v that arise in Algebraic Geometry and play a central role in Algebraic Combinatorics. It is a major open problem whether they have a combinatorial interpretation, i.e, whether cwu,v ∈ \# P. We study the closely related vanishing problem of Schubert coefficients: \cwu,v=? 0\. Until this work it was open whether this problem is in the polynomial hierarchy PH. We prove that \cwu,v=? 0\ in coAM assuming the GRH. In particular, the vanishing problem is in 2p. Our approach is based on constructions lifted formulations, which give polynomial systems of equations for the problem. The result follows from a reduction to Parametric Hilbert's Nullstellensatz, recently studied in arXiv:2408.13027. We extend our results to all classical types. Type D is resolved in the appendix (joint with David Speyer).
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