Arithmetic properties of k-tuple -regular partitions

Abstract

In this paper, we study arithmetic properties satisfied by the k-tuple -regular partitions. A k-tuple of partitions (1, 2, …, k) is said to be -regular if all the i's are -regular. We study the cases (, k)=(2,3), (4,3), (, p), where p is a prime, and even the general case when both and k are unrestricted. Using elementary means as well as the theory of modular forms we prove several infinite family of congruences and density results for these family of partitions.

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