The largest values of Dedekind sums
Abstract
Let s(m,n) denote the classical sum, where n is a positive integer and m∈\0,1,…, n-1\, (m,n)=1. For a given positive integer k, we describe a set of at most k2 numbers m for which s(m,n) may be s(k,n), provided that n is sufficiently large. For the numbers m not in this set, s(m,n)<s(k,n).
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