On $p$-adic valuations of colored $p$-ary partitions

TL;DR

This paper investigates the p-adic valuations of colored p-ary partition numbers, establishing exact valuations for certain parameters and generalizing previous results from the case p=2 to all primes p≥3.

Contribution

It proves that for primes p≥3 and specific parameters, the p-adic valuation of the partition sequence is exactly 1 beyond a certain point, extending earlier results from p=2.

Findings

p-adic valuation equals 1 for n≥p^s in specified cases

Results extend previous work from p=2 to all primes p≥3

Behavior of valuations for fixed u and p analyzed

Abstract

Let $m\in\N_{\geq 2}$ and for given $k\in\N_{+}$ consider the sequence $(A_{m,k}(n))_{n\in\N}$ defined by the power series expansion $$ \prod_{n=0}^{\infty}\frac{1}{\left(1-x^{m^{n}}\right)^{k}}=\sum_{n=0}^{\infty}A_{m,k}(n)x^{n}. $$ The number $A_{m,k}(n)$ counts the number of representations of $n$ as sums of powers of $m$, where each summand has one among $k$ colors. In this note we prove that for each $p\in\mathbb{P}_{\geq 3}$ and $s\in\N_{+}$, the $p$-adic valuation of the number $A_{p,(p-1)(p^s-1)}(n)$ is equal to 1 for $n\geq p^s$. We also obtain some results concerning the behaviour of the sequence $(\nu_{p}(A_{p,(p-1)(up^s-1)}(n)))_{n\in\N}$ for fixed $u\in\{2,\ldots,p-1\}$ and $p\geq 3$. Our results generalize the earlier findings obtained for $p=2$ by Gawron, Miska and the first author.