On the asymptotics of a cotangent sum related to the Estermann zeta function
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🧮 math.CA
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estermannfunctionrelatedtermszetaadditionalasymptoticasymptotics
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The sum $c_0(1/k)=-\sum_{m=1}^{k-1}(m/k)\cot(m{\pi}/k)$ is related to the Estermann zeta function. A recent paper computes the first two terms of the large-$k$ asymptotic expansion of $c_0(1/k)$. Using the Poisson summation formula for finite sums, we find three additional terms.
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