Cyclic sieving and rational Catalan theory
Abstract
Let a < b be coprime positive integers. Armstrong, Rhoades, and Williams defined a set NC(a,b) of `rational noncrossing partitions', which form a subset of the ordinary noncrossing partitions of \1, 2, …, b-1\. Confirming a conjecture of Armstrong et. al., we prove that NC(a,b) is closed under rotation and prove an instance of the cyclic sieving phenomenon for this rotational action. We also define a rational generalization of the Sa-noncrossing parking functions of Armstrong, Reiner, and Rhoades.
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