Random Chowla’s conjecture for Rademacher multiplicative functions , url=

Chinis, Jake, Shala, Besfort , year= · 2025 · DOI 10.1090/tran/9457

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Escaping Chaos in Random Multiplicative Functions

math.NT · 2026-05-20 · unverdicted · novelty 7.0

Proves that sum of Steinhaus random multiplicative function over A converges to CN(0,1) only if |A|=o(N), with sharpness for most sets of density ρ where (1-ρ)^{-1}=o((log log N)^{1/2}).

A few notes on the asymptotic behavior of Rademacher random multiplicative functions

math.PR · 2025-09-23 · unverdicted · novelty 5.0

Obtains unrestricted high-moment estimates and exponential tail bounds for sums of Rademacher multiplicative functions via martingales.

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Escaping Chaos in Random Multiplicative Functions math.NT · 2026-05-20 · unverdicted · none · ref 141
Proves that sum of Steinhaus random multiplicative function over A converges to CN(0,1) only if |A|=o(N), with sharpness for most sets of density ρ where (1-ρ)^{-1}=o((log log N)^{1/2}).

Random Chowla’s conjecture for Rademacher multiplicative functions , url=

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