Akash Singha Roy scite author profile

We provide a criterion to determine whether a real multiplicative function is a strong Benford sequence. The criterion implies that the k-divisor functions, where k = 10 j , and Hecke eigenvalues of newforms, such as Ramanujan tau function, are strong Benford. Moreover, we deduce from the criterion that the collection of multiplicative functions which are not strong Benford forms a group under pointwise multiplication. In contrast to earlier work, our approach is based on Halász's Theorem.From now on, we will refer to strong Benford's law simply as "Benford's law."

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Dirichlet, Sierpiński, and Benford

Pollack

Roy

2022

Journal of Number Theory

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Pollack¹,

Roy

2021

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Akash Singha Roy

Joint distribution in residue classes of polynomial-like multiplicative functions

Distribution in coprime residue classes of polynomially-defined multiplicative functions

On Benford's Law for multiplicative functions

Dirichlet, Sierpiński, and Benford

Solutions to Step #1

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