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Paper detail

Partial sums of the cotangent function

Nous prouvons l'existence de formules de réciprocité pour des sommes de la forme $\sum_{m=1}^{k-1} f(\frac{m}k) \cot(π\frac{mh}k)$, où $f$ est une fonction $C^1$ par morceaux, qui met en évidence un phénomène d'alternance qui n'apparaît pas dans le cas classique où $f(x) = x$. Nous déduisons des majorations de ces sommes en termes du développement en fraction continue de $h/k$. We prove the existence of reciprocity formulae for sums of the form $\sum_{m=1}^{k-1}f(\frac{m}{k})\cot(π\frac{m h}k)$ where $f$ is a piecewise $C^1$ function, featuring an alternating phenomenon not visible in the classical case where $f(x)=x$. We deduce bounds for these sums in terms of the continued fraction expansion of $h/k$.

preprint2020arXivOpen access
Sandro BettinSary Drappeau
math.NT
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Sandro BettinSary Drappeau

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