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arxiv: 2010.13918 · v1 · pith:7S5V6ITInew · submitted 2020-10-26 · 🧮 math.AG · math.CO

A Robinson-Schensted Correspondence for Partial Permutations

classification 🧮 math.AG math.CO
keywords mathsflambdaschubertcorrespondencematrixsizevarietypartial
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We study the Steinberg variety associated to matrix Schubert varieties, and develop a Robinson-Schensted type correspondence, $\tau\leftrightarrow(\Lambda,\mathsf Q,\mathsf P)$. Here $\tau$ is a partial permutation of size $p\times q$, $\Lambda$ an admissible signed Young diagram of size $p+q$, and $\mathsf P$ (resp. $\mathsf Q$) a standard Young tableau of size $p$ (resp. $q$) whose shape is determined by $\Lambda$. By embedding the matrix Schubert variety into a Schubert variety, we find a close relationship between the combinatorics of the classical Robinson-Schensted-Knuth correspondence and our bijection. We also show that an involution $(\Lambda,\mathsf Q,\mathsf P)\mapsto(\Lambda^\vee,\mathsf P,\mathsf Q)$ corresponds to projective duality on matrix Schubert varieties.

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