We study analytic properties of “q-deformed real numbers”, a notion recently introduced by two of us. A q-deformed positive real number is a power series with integer coefficients in one formal variable q. We study the radius of convergence of these power series assuming that q is a complex variable. Our main conjecture, which can be viewed as a q-analogue of Hurwitz's Irrational Number Theorem, claims that the q-deformed golden ratio has the smallest radius of convergence among all real numbers. The conjecture is proved for certain class of rational numbers and confirmed by a number of computer experiments. We also prove the explicit lower bounds for the radius of convergence for the q-deformed convergents of golden and silver ratios.
Funding
ANR project ANR-19-CE40-0021
History
School
Science
Department
Mathematical Sciences
Published in
Moscow Mathematical Journal
Volume
24
Issue
1
Pages
1 - 19
Publisher
Independent University of Moscow, together with the Mathematical Department of the Higher School of Econonics and Moscow Center for Continuous Mathematical Education
Materials in this journal may be reproduced by any means for educational and scientific purposes without fee or permission (provided that the customary acknowledgment of the source is given). This consent does not extend to other kinds of copying for general distribution, for advertising or promotional purposes, or for resale.