Jerrold R. Griggs
Published 1993-04-01Version 1
We generalize and solve the $\roman{mod}\,q$ analogue of a problem of Littlewood and Offord, raised by Vaughan and Wooley, concerning the distribution of the $2^n$ sums of the form $\sum_{i=1}^n\varepsilon_ia_i$, where each $\varepsilon_i$ is $0$ or $1$. For all $q$, $n$, $k$ we determine the maximum, over all reduced residues $a_i$ and all sets $P$ consisting of $k$ arbitrary residues, of the number of these sums that belong to $P$.
Comments: 5 pages
Journal: Bull. Amer. Math. Soc. (N.S.) 28 (1993) 329-333
The distribution of $k$-tuples of reduced residues
The distribution of integers with a divisor in a given interval
Gaps between zeros of $ζ(s)$ and the distribution of zeros of $ζ'(s)$
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