An Alternative Generating Function for k-Regular Partitions
Abstract
We construct a k-fold q-series as a generating function of k-regular partitions for each positive integer k. The k=1 case is one of Euler's q-series identities pertaining to the partitions into distinct parts. The construction is combinatorial. Although we find a connection to Bessel polynomials in the k=2 case, this note is certainly not a study of Bessel polynomials and their q-analogs.
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