On the distribution of a cotangent sum
Abstract
Maier and Rassias computed the moments and proved a distribution result for the cotangent sum c0(a/q):=-Σm<q mq(π maq) on average over 1/2<A0≤ a/q<A1<1, as q→ ∞. We give a simple argument that recovers their results (with stronger error terms) and extends them to the full range 1≤ a<q. Moreover, we give a density result for c0 and answer a question posed by Maier and Rassias on the growth of the moments of c0.
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