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The Sidon Decomposition Problem in Abelian Groups of Bounded Torsion

Published 4 Jun 2026 in math.CA, math.CO, math.FA, and math.GR | (2606.06669v1)

Abstract: Let $G$ be a compact abelian group whose dual group $Γ=\widehat{G}$ has bounded torsion. In 1967, Malliavin-Brameret and Malliavin proved that every Sidon set in $Γ$ is a finite union of quasi-independent sets when $Γ$ has prime exponent. This was later extended to squarefree exponents in work of Varopoulos and Bourgain. We prove the remaining bounded-torsion case. Consequently, if $\widehat{G}$ has bounded torsion, then a subset $Λ\subset \widehat{G}\setminus{0}$ is Sidon if and only if it is a finite union of quasi-independent sets.

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