A note on p-adic valuations of the Schenker sums

Abstract

A prime number p is called a Schenker prime if there exists such n∈N+ that p n and p an, where an = Σj=0nn!j!nj is so-called Schenker sum. T. Amdeberhan, D. Callan and V. Moll formulated two conjectures concerning p-adic valuations of an in case when p is a Schenker prime. In particular, they asked whether for each k∈N+ there exists the unique positive integer nk<pk such that vp(am· 5k + nk)≥ k for each nonnegative integer m. We prove that for every k∈N+ the inequality v5(an)≥ k has exactly one solution modulo 5k. This confirms the first conjecture stated by the mentioned authors. Moreover, we show that if 37 n then v37(an)≤ 1, what means that the second conjecture stated by the mentioned authors is not true.