A question on signed Stirling numbers of the first kind

Question

Let $(x)_0=1$ and $(x)_n=x(x-1)\cdots(x-n+1)$ for $n=1,2,3,\ldots$. The signed Stirling numbers of the first kind, $s(n,k)$ with $n\ge k\ge0$, are defined by $$(x)_n=\sum_{k=0}^ns(n,k)x^k.$$

Question. Whether for each integer $k\ge12$ and any prime $p$ the set $$\{s(n,k):\ n=k,k+1,\ldots\}$$ contains a complete system of residues modulo $p$?

I conjecture that this question has a positive answer. For $12\le k\le 100$ and any prime $p<300$, I have verified that the set $\{s(n,k):\ n=k,k+1,\ldots\}$ contains a complete system of residues modulo $p$. It seems that the set $\{s(n,11):\ n\ge11\}$ contains no number congruent to $6$ modulo $19$.

A similar problem with $s(n,k)$ replaced by the binomial coefficient $\binom{n}{k}$ was studied in the following paper: Zhi-Wei Sun and Wei Zhang, Binomial coefficients and the ring of $p$-adic integers, Proc. Amer. Math. Soc. 139 (2011), no. 5, 1569-1577.

Your comments are welcome!

Answer 1

There is some $N(k, p)$ such that $n \ge N(k, p) \implies s(n, k) \equiv 0 \pmod p$. Proof is straightforward by fixing $p$ and using induction on $k$ via the recurrence $$s(n, k) = s(n-1, k-1) - (n-1)s(n-1, k).$$ In fact, the same proof idea shows that $N(k, p) \le kp+1$ so this allows for effective testing of $(k, p)$. Fedor Petrov's first comment on the question hints at this.

Fedor's second comment argues heuristically that counterexamples should exist in primes of the order of $e^k$. In practice, the smallest counterexamples seem to be much smaller than that.

$$\begin{array}{ccc} k & p & \textrm{Uncovered residues} \\ 12 & 509 & \{150\} \\ 13 & 2243 & \{1761\} \\ 14 & 5233 & \{1128\} \\ 15 & 5233 & \{4105\} \\ 16 & 5233 & \{1128\} \\ 17 & 5233 & \{4105\} \\ 18 & 5233 & \{1128\} \\ 19 & 73681 & \{926\} \\ 20 & 153611 & \{108851\} \\ 21 & 212671 & \{50455\} \\ 22 & 232129 & \{169472\} \\ \end{array}$$