Bumpless pipe dreams and alternating sign matrices
| Autor: | Anna Weigandt |
|---|---|
| Rok vydání: | 2021 |
| Předmět: |
Class (set theory)
Mathematics::Combinatorics Flag (linear algebra) 010102 general mathematics Schubert polynomial 0102 computer and information sciences Expression (computer science) 01 natural sciences Theoretical Computer Science Combinatorics Computational Theory and Mathematics 010201 computation theory & mathematics FOS: Mathematics Bijection Mathematics - Combinatorics Discrete Mathematics and Combinatorics Combinatorics (math.CO) Alternating sign matrix 0101 mathematics Variety (universal algebra) Mathematics::Representation Theory Mathematics Sign (mathematics) |
| Zdroj: | Journal of Combinatorial Theory, Series A. 182:105470 |
| ISSN: | 0097-3165 |
| DOI: | 10.1016/j.jcta.2021.105470 |
| Popis: | In their work on the infinite flag variety, Lam, Lee, and Shimozono (2018) introduced objects called bumpless pipe dreams and used them to give a formula for double Schubert polynomials. We extend this formula to the setting of K-theory, giving an expression for double Grothendieck polynomials as a sum over a larger class of bumpless pipe dreams. Our proof relies on techniques found in an unpublished manuscript of Lascoux (2002). Lascoux showed how to write double Grothendieck polynomials as a sum over alternating sign matrices. We explain how to view the Lam-Lee-Shimozono formula as a disguised special case of Lascoux's alternating sign matrix formula. Knutson, Miller, and Yong (2009) gave a tableau formula for vexillary Grothendieck polynomials. We recover this formula by showing vexillary marked bumpless pipe dreams and flagged set-valued tableaux are in weight preserving bijection. Finally, we give a bijection between Hecke bumpless pipe dreams and decreasing tableaux. The restriction of this bijection to Edelman-Greene bumpless pipe dreams solves a problem of Lam, Lee, and Shimozono. Comment: 44 pages |
| Databáze: | OpenAIRE |
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