On a criterion for the equality of Dedekind Sums

Abstract

In [3] it was shown that the Dedekond sums s(m1,n) and s(m2,n) are equal only if (m1m2-1)(m1-m2) 0 mod n. Here we show that the latter condition is equivalent to 12s(m1,n)-12s(m2,n)∈ . In addition, we determine, for a given number m1, the number of integers m2 in the range 0 m2<n, (m1,m2)=1, such that 12s(m1,n)-12s(m2,n)∈ , provided that n is square-free.