Rigid toric matrix Schubert varieties
Algebraic Geometry
2022-06-22 v2 Combinatorics
Representation Theory
Abstract
For a given permutation , Fulton proves that the matrix Schubert variety can be defined via certain rank conditions encoded in the Rothe diagram of . In the case where is toric (with respect to a action), we show that it can be described as an edge ideal of a bipartite graph . We characterize the lower dimensional faces of the associated so-called edge cone explicitly in terms of subgraphs of and present a combinatorial study for the first order deformations of . We prove that is rigid if and only if the three-dimensional faces of are all simplicial. Moreover, we reformulate this result in terms of Rothe diagram of .
Cite
@article{arxiv.2001.11949,
title = {Rigid toric matrix Schubert varieties},
author = {Irem Portakal},
journal= {arXiv preprint arXiv:2001.11949},
year = {2022}
}
Comments
15 pages