P-strict promotion and Q-partition rowmotion: the graded case
Abstract
Promotion and rowmotion are intriguing actions in dynamical algebraic combinatorics which have inspired much work in recent years. In this paper, we study P-strict labelings of a finite, graded poset P of rank n and labels at most q, which generalize semistandard Young tableaux with n rows and entries at most q, under promotion. These P-strict labelings are in equivariant bijection with Q-partitions under rowmotion, where Q equals the product of P and a chain of q-n-1 elements. We study the case where P equals the product of chains in detail, yielding new homomesy and order results in the realm of tableaux and beyond. Furthermore, we apply the bijection to the cases in which P is a minuscule poset and when P is the three element V poset. Finally, we give resonance results for promotion on P-strict labelings and rowmotion on Q-partitions.
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