Distribution Modulo 1 of Some Oscillating Sequences. III |
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| Authors: | Daniel Berend Michael D. Boshernitzan Grigori Kolesnik |
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| Affiliation: | (1) Departments Of Mathematics And Computer Science, Ben-Gurion University, Beer-Sheva, 84105, Israel |
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| Abstract: | ![]()
For some oscillating functions, such as  , we consider the distribution properties modulo 1 (density, uniform distribution) of the sequence  ,  . We obtain positive and negative results covering the case when the factor  is replaced by an arbitrary function  of at most polynomial growth belonging to any Hardy field. (The latter condition may be viewed as a regularity growth condition on  .) Similar results are obtained for the subsequence  , taken over the primes  |
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| Keywords: | Density modulo 1 distribution modulo 1 uniform distribution exponential sums Hardy field |
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