On Glaisher's Partition Theorem

Abstract

Glaisher's theorem states that the number of partitions of n into parts which repeat at most m-1 times is equal to the number of partitions of n into parts which are not divisible by m. The m=2 case is Euler's famous partition theorem. Recently, Andrews, Kumar, and Yee gave two new partition functions C(n) and D(n) related to Euler's theorem. Lin and Zang extended their result to Glaisher's theorem by generalizing C(n). We generalize D(n) and prove an analogous partition identity for the m=3 case. We also provide a new series equal to Glaisher's product both in the finite and infinite cases.

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