Congruences Relating Regular Partition Functions, a Genearalised Tau Function and Partition Function Weighted Composition Sums
Abstract
Let n and t be positive integers with t≥ 2. Let Rt(n) be the number of t-regular partitions of n. A class of functions, denoted τk(n), is defined as follows: \[qΠm=1∞(1-qm)k=Σn=1∞τk(n)qn, \] where k is an integer. We express τk(n) as a binomial coefficient weighted partition sum. Consequently, we obtain congruence identities that relate τk(n), Rt(n) and partition function weighted composition sums.
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