Abstract
Let s(n) denote the number of ones in the binary expansion of the nonnegative integer n. How does s behave under addition of a constant t? In order to study the differences
s(n+t)−s(n), for all n≥0, we consider the associated characteristic function γt. Our main theorem is a structural result on the decomposition of γt into a sum of components. We also study in detail the case that t contains at most two blocks of consecutive 1s. The results in this paper are motivated by Cusick’s conjecture on the sum-of-digits function. This conjecture is concerned with the central tendency of the corresponding probability distributions, and is still unsolved.
s(n+t)−s(n), for all n≥0, we consider the associated characteristic function γt. Our main theorem is a structural result on the decomposition of γt into a sum of components. We also study in detail the case that t contains at most two blocks of consecutive 1s. The results in this paper are motivated by Cusick’s conjecture on the sum-of-digits function. This conjecture is concerned with the central tendency of the corresponding probability distributions, and is still unsolved.
| Original language | English |
|---|---|
| Pages (from-to) | 702-736 |
| Number of pages | 35 |
| Journal | Journal of number theory |
| Volume | 2026 |
| Issue number | Volume 280, March |
| DOIs | |
| Publication status | E-pub ahead of print - 2 Oct 2025 |
Keywords
- sum-of-digits function
- correlation measure
- Valuation of binomial coefficients
- Cusick's conjecture
- Hamming weight
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