On the representation functions of certain numeration systems

Abstract

Let β>1 be fixed. We consider the (b, d) numeration system, where the base b=(bk)k≥ 0 is a sequence of positive real numbers satisfying k→ ∞bk+1/bk=β, and the set of digits d 0 is a finite set of nonnegative real numbers with at least two elements. Let rb, d(λ) denote the number of representations of a given λ∈R by sums Σk 0δkbk with δk in d. We establish upper bounds and asymptotic formulas for rb,d(λ) and its arbitrary moments, respectively. We prove that the associated zeta function ζb, d(s):=Σλ>0rb, d(λ)λ-s can be meromorphically continued to the entire complex plane when bk=βk, and to the half-plane (s)>β |d|-γ when bk=βk+O(β(1-γ)k), with any fixed γ∈(0,1], respectively. We also determine the possible poles, compute the residues at the poles, and locate the trivial zeros of ζb, d(s) in the regions where it can be extended. As an application, we answer some problems posed by Chow and Slattery on partitions into distinct terms of certain integer sequences.