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Unboundedness of the Coefficients of Higher Powers of a Unimodular Power Series

Published 25 Jun 2026 in math.CO | (2606.28411v1)

Abstract: Let $R(z)=\sum_{n=0}{\infty} r_n zn$ be a power series with $|r_n|=1$ for every $n\ge 0$. We show that for each integer $m\ge 2$, the coefficient sequence of $R(z)m$ is unbounded. The proof combines Parseval's identity with Jensen's inequality. As a consequence, Conjecture~3.9 of Gawron, Miska, and Ulas \cite{gmu} is confirmed.

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