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Density
properties of fractions with Euler's totient function
Karin Halupczok and Marvin Ohst |
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Vol. 19 (2026), No. 1, 1–31
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Abstract |
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We prove that, for all constants , , , , the fractions lie dense in the interval (and in if ), where . This interval is the largest possible, since it may happen that isolated fractions lie outside of the interval: we prove a complete determination of the case where this happens, which yields an algorithm that calculates the number of such that for coprime and any . Furthermore, this leads to an interesting open question which is a generalization of a famous problem raised by V. Arnold. We prove that the fractions with constants , lie dense in exactly when . |
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Keywords
Euler's totient function, Schinzel density, Arnold's
question
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Mathematical Subject Classification
Primary: 11A07, 11N37, 11N56, 11N69
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Milestones
Received: 27 September 2022
Revised: 9 July 2024
Accepted: 2 September 2024
Published: 17 January 2026
Communicated by Vadim Ponomarenko
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Authors |
| Karin Halupczok | |
| Mathematisches Institut Heinrich Heine Universität Düsseldorf Düsseldorf Germany |
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| Marvin Ohst | |
| Mathematisches Institut Heinrich Heine Universität Düsseldorf Düsseldorf Germany |
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| © 2026 MSP (Mathematical Sciences Publishers). |
