On some coefficients of the Artin-Hasse series modulo a prime

Abstract

Let p be an odd prime, and let Σn=0∞ anXn∈Fp[[X]] be the reduction modulo p of the Artin-Hasse exponential. We obtain a polynomial expression for akp in terms of those arp with r<k, for even k<p2-1. A conjectural analogue covering the case of odd k<p can be stated in various polynomial forms, essentially in terms of the polynomial γ(X) =Σn=1p-2(Bn/n)Xp-n, where Bn denotes the n-th Bernoulli number. We prove that γ(X) satisfies the functional equation γ(X-1)-γ(X)=1(X)+Xp-1-wp-1 in Fp[X], where 1(X) and wp are the truncated logarithm and the Wilson quotient. This is an analogue modulo p of a functional equation, in Q[[X]], established by Zagier for the power series Σn=1∞(Bn/n)Xn. Our proof of the functional equation establishes a connection with a result of Nielsen of 1915, of which we provide a fresh proof. Our polynomial framing allows us to derive congruences for certain numerical sums involving divided Bernoulli numbers.