Gamze Savaş Çelik, Mohammad Sadek, Gökhan Soydan
Published 2020-10-08Version 1
A sequence of rational points on an algebraic planar curve is said to form an $r$-geometric progression sequence if either the abscissae or the ordinates of these points form a geometric progression sequence with ratio $r$. In this work, we prove the existence of infinitely many rational numbers $r$ such that for each $r$ there exist infinitely many $r$-geometric progression sequences on the unit circle $x^2 + y^2 = 1$ of length at least $3$.
Comments: 7 pages, accepted for publication in Publicationes Mathematicae Debrecen
Fields of Definition of Rational Points on Varieties
The Hardy--Littlewood conjecture and rational points
Unboundedness of the number of rational points on curves over function fields
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