On the variance of the digits of 1/p

Abstract

Let p>3 be a prime and b 2 an integer such that p does not divide b. Then 1/p has a periodic digit expansion with respect to the basis b. The length q of the period is the (multiplicative) order of b mod p. In the case q=p-1 a formula for the variance of the digits of a period was given previously. This formula involves a Dedekind sum. We determine the variance in the case q=(p-1)/2. If p 3 mod 4 a Dedekind sum and the class number of Q(-p) occur in the respective formula. If p 1 mod 4, the formula may be much more complex since it involves linear combinations of (possibly many) products of two Bernoulli numbers attached to odd characters.