Let $n$ and $k$ be positive integers. The Stirling number of the first kind, denoted by $s(n,k)$, counts the number of permutations of $n$ elements with $k$ disjoint cycles. Let $p$ be a prime number and denote by $v_p(n)$ the $p$-adic valuation of $n$. In recent years, Lengyel, Komatsu, Young, Leonetti and Sanna made some progress on $v_p(s(n,k))$. Let $a\in\{1,2\}$. In this paper, by using the properties of $m$-th Stirling number of the first kind developed previously and providing a detailed 3-adic analysis, we arrive at an explicit formula on $v_3(s(a3^n, k))$ with $1\le k\le a3^n$. This gives an evidence to a conjecture of Hong and Qiu proposed in 2020. As a corollary, we show that $v_3(s(a3^n,a3^n-k))=2n-1+v_3(k)-v_3(k-1)$ if $k$ is odd and $3\le k\le a3^{n-1}+1$. This supports a conjecture of Lengyel raised in 2015.
Comment: 33pages. arXiv admin note: text overlap with arXiv:1812.04539