On the Monotonicity of Higher-Fold Representation Functions

Abstract

For a positive integer h, let RA,h(n) denote the number of ordered representations n=s1+·s+sh with all si∈ A. Let \[ B=\0\\m 1: the base-4 expansion of m begins with 1 or 2\. \] Shallit proved that RB,3(n) is strictly increasing, thereby disproving a 2002 conjecture of Dombi. In this paper, by using linear bounds for RB,3(n+1)-RB,3(n) and a convolution argument, we prove the polynomial order of RB,h(n+1)-RB,h(n) for every integer h 3. More precisely, for every integer h 3, there exist constants ch,Ch>0, depending only on h, such that \[ ch nh-2 RB,h(n+1)-RB,h(n) Ch nh-2 \] for all integers n 1. We also construct a co-infinite set C⊂ N satisfying n∞C(n)/n=1 such that RC,h(n) is strictly increasing for every integer h 3. This answers a problem of Dombi posed in 2002. We also pose some problems for further research.