Structure of associated sets to Midy's Property

Abstract

Let b be a positive integer greater than 1, N a positive integer relatively prime to b, |b|N the order of b in the multiplicative group % UN of positive integers less than N and relatively primes to % N, and x∈UN. It is well known that when we write the fraction xN in base b, it is periodic. Let d,\,k be positive integers with % d≥2 and such that |b|N=kd and xN=0.% bara1a2...a|b|N with the bar indicating the period and ai are digits in base b. We separate the period a1a2... a|b|N in d blocks of length k and let Aj=[a(j-1)k+1a(j-1)k+2...ajk]b be the number represented in base b by the j-th block and % Sd(x)=Σj=1dAj. If for all x∈UN, the sum Sd(x) is a multiple of bk-1 we say that N has the Midy's property for b and d. In this work we present some interesting properties of the set of positive integers d such that N has the Midy's property for b and d.