On the Enumeration of (s,s+1,s+2)-Core Partitions
Abstract
Anderson established a connection between core partitions and order ideals of certain posets by mapping a partition to its β-set. In this paper, we give a characterization of the poset P(s,s+1,s+2) whose order ideals correspond to (s,s+1,s+2)-core partitions. Using this characterization, we obtain the number of (s,s+1,s+2)-core partitions, the maximum size and the average size of an (s,s+1,s+2)-core partition, confirming three conjectures posed by Amdeberhan.
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