On the p-adic properties of Stirling numbers of the first kind

Abstract

Let n, k and a be positive integers. The Stirling numbers of the first kind, denoted by s(n,k), count the number of permutations of n elements with k disjoint cycles. Let p be a prime. In recent years, Lengyel, Komatsu and Young, Leonetti and Sanna, Adelberg, Hong and Qiu made some progress in the study of the p-adic valuations of s(n,k). In this paper, by using Washington's congruence on the generalized harmonic number and the n-th Bernoulli number Bn and the properties of m-th Stirling numbers of the first kind obtained recently by the authors, we arrive at an exact expression or a lower bound of vp(s(ap, k)) with a and k being integers such that 1 a p-1 and 1 k ap. This infers that for any regular prime p 7 and for arbitrary integers a and k with 5 a p-1 and a-2 k ap-1, one has vp(H(ap-1,k))<-(ap-1)2 p with H(ap-1, k) being the k-th elementary symmetric function of 1, 12, ..., 1ap-1. This gives a partial support to a conjecture of Leonetti and Sanna raised in 2017. We also present results on vp(s(apn,apn-k)) from which one can derive that under certain condition, for any prime p 5, any odd number k 3 and any sufficiently large integer n, if (a,p)=1, then vp(s(apn+1,apn+1-))=vp(s(apn,apn-k))+2. It confirms partially Lengyel's conjecture proposed in 2015.