Generalizations of Dyson's Rank on Overpartitions
Abstract
We introduce a statistic on overpartitions called the k-rank. When there are no overlined parts, this coincides with the k-rank of a partition introduced by Garvan. Moreover, it reduces to the D-rank of an overpartition when k=2. The generating function for the k-rank of overpartitions is given. We also establish a relation between the generating function of self-3-conjugate overpartitions and the tenth order mock theta functions X(q) and (q).
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