The number of Dedekind sums with equal fractional parts
Abstract
In a previous it was shown that the Dedkind sums 12s(m,n) and 12s(x,n), 1 m,x n, (m,n)=(x,n)=1, are equal mod if, and only if, (x-m)(xm-1) 0 mod n. Here we determine the cardinality of numbers x in the above range that satisfy this congruence for a given number m.
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