Crystal Chute Moves on Pipe Dreams
Document Type
Journal Article
Role
Author
Journal Title
Annals of Combinatorics
Publication Date
3-12-2025
Abstract
Schubert polynomials represent a basis for the cohomology of the complete flag variety and thus play a central role in geometry and combinatorics. In this context, Schubert polynomials are generating functions over various combinatorial objects, such as rc-graphs or reduced pipe dreams. By restricting Bergeron and Billey’s chute moves on rc-graphs, we define a Demazure crystal structure on the monomials of a Schubert polynomial. As a consequence, we provide a method for decomposing Schubert polynomials as sums of key polynomials, complementing related work of Assaf and Schilling via reduced factorizations with cutoff, as well as Lenart’s coplactic operators on biwords.
Repository Citation
Gold, S. '23, Milićević, E. & Sun, Y. '23 (2025). "Crystal Chute Moves on Pipe Dreams." Annals of Combinatorics. Available: https://doi.org/10.1007/s00026-025-00747-0
