The density of \(B_ h[g]\) sequences and the minimum of dense cosine sums
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Publication:1907848
DOI10.1006/jnth.1996.0002zbMath0849.11014OpenAlexW2058327380WikidataQ105583209 ScholiaQ105583209MaRDI QIDQ1907848
Publication date: 19 March 1996
Published in: Journal of Number Theory (Search for Journal in Brave)
Full work available at URL: https://doi.org/10.1006/jnth.1996.0002
Related Items (17)
Upper and lower bounds on the size of $B_k[g$ sets] ⋮ On extreme values for the Sudler product of quadratic irrationals ⋮ On the order of magnitude of Sudler products ⋮ On the Number ofBh-Sets ⋮ On a paper of Erdős and Szekeres ⋮ Generalized Sidon sets ⋮ An upper bound for \(B_2 [2\) sequences] ⋮ Discrete radar ambiguity problems ⋮ Generalized difference sets and autocorrelation integrals ⋮ A new upper bound for \(B_2 [2\) sets] ⋮ New upper bounds for finite \(B_h\) sequences ⋮ Constructions of generalized Sidon sets. ⋮ Infinite \(B_2[g\) sequences] ⋮ B2[g Sets and a Conjecture of Schinzel and Schmidt] ⋮ On the uniform distribution in residue classes of dense sets of integers with distinct sums ⋮ On suprema of autoconvolutions with an application to Sidon sets ⋮ Upper and lower bounds for finite \(B_h[g\) sequences.]
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