Hyper b-ary expansions and Stern polynomials
Abstract
We study a recently introduced base b polynomial analog of Stern's diatomic sequence, which generalizes Stern polynomials of Klavar, Dilcher, Ericksen, Mansour, Stolarsky, and others. We lift some basic properties of base 2 Stern polynomials to arbitrary base, and introduce a matrix characterization of Stern polynomials. By specializing, we recover some new number theoretic results about hyper b-ary partitions, which count partitions of n into powers of b.
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