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Equidistribution of subset sums
Péter Pál Pach · 2025-05-19 · via math.CO updates on arXiv.org

We answer a question of Katona and Makar-Limanov, by showing that in an abelian group of order $2h$ the $h$-element subset sums are asymptotically (as $h\to \infty$) equidistributed. In fact we prove a more general result where the order of the group can be arbitrary, also providing a bound for the ``error term''.

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