On the Trajectories of a Particle in a Translation Invariant Involutive Field

Cristian Cobeli; Alexandru Zaharescu

doi:10.1007/s00025-024-02240-1

On the Trajectories of a Particle in a Translation Invariant Involutive Field

Cristian Cobeli
, Alexandru Zaharescu

Mathematics

Research output: Contribution to journal › Article › peer-review

Abstract

We introduce a double-folded operator that, upon iterative application, generates a dynamical system with two types of trajectories: a cyclic one and, another that grows endlessly on parabolas. These trajectories produce two distinct partitions of the set of lattice points in the plane. Our object is to analyze these trajectories and to point out a few special arithmetic properties of the integers they represent. We also introduce and study the parabolic-taxicab distance, which measures the fast traveling on the steps of the stairs defined by points on the parabolic trajectories whose coordinates are based on triangular numbers.

Original language	English (US)
Article number	223
Journal	Results in Mathematics
Volume	79
Issue number	6
Early online date	Aug 9 2024
DOIs	https://doi.org/10.1007/s00025-024-02240-1
State	Published - Sep 2024

Keywords

Lattice points
Primary 11B37
Secondary 11B50
discrete trajectory
modular prime covering
parabolic-taxicab distance
partition with parabolas
translation-invariant-involutive operator

ASJC Scopus subject areas

Mathematics (miscellaneous)
Applied Mathematics

Online availability

10.1007/s00025-024-02240-1

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title = "On the Trajectories of a Particle in a Translation Invariant Involutive Field",

abstract = "We introduce a double-folded operator that, upon iterative application, generates a dynamical system with two types of trajectories: a cyclic one and, another that grows endlessly on parabolas. These trajectories produce two distinct partitions of the set of lattice points in the plane. Our object is to analyze these trajectories and to point out a few special arithmetic properties of the integers they represent. We also introduce and study the parabolic-taxicab distance, which measures the fast traveling on the steps of the stairs defined by points on the parabolic trajectories whose coordinates are based on triangular numbers.",

keywords = "Lattice points, Primary 11B37, Secondary 11B50, discrete trajectory, modular prime covering, parabolic-taxicab distance, partition with parabolas, translation-invariant-involutive operator",

author = "Cristian Cobeli and Alexandru Zaharescu",

note = "The authors acknowledge the essential role of their children Bianca, \textbackslash{}u015Etefan and Dan, dating back to the summer of 1997, for the intuitive description of the parabolic-taxicab distance using the elevator in the Wayside School. Also, they thank Evgeniya Ovchinnikova for fruitful discussions and for the link up to the bamboozle.",

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AU - Zaharescu, Alexandru

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N2 - We introduce a double-folded operator that, upon iterative application, generates a dynamical system with two types of trajectories: a cyclic one and, another that grows endlessly on parabolas. These trajectories produce two distinct partitions of the set of lattice points in the plane. Our object is to analyze these trajectories and to point out a few special arithmetic properties of the integers they represent. We also introduce and study the parabolic-taxicab distance, which measures the fast traveling on the steps of the stairs defined by points on the parabolic trajectories whose coordinates are based on triangular numbers.

AB - We introduce a double-folded operator that, upon iterative application, generates a dynamical system with two types of trajectories: a cyclic one and, another that grows endlessly on parabolas. These trajectories produce two distinct partitions of the set of lattice points in the plane. Our object is to analyze these trajectories and to point out a few special arithmetic properties of the integers they represent. We also introduce and study the parabolic-taxicab distance, which measures the fast traveling on the steps of the stairs defined by points on the parabolic trajectories whose coordinates are based on triangular numbers.

KW - Lattice points

KW - Primary 11B37

KW - Secondary 11B50

KW - discrete trajectory

KW - modular prime covering

KW - parabolic-taxicab distance

KW - partition with parabolas

KW - translation-invariant-involutive operator

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On the Trajectories of a Particle in a Translation Invariant Involutive Field

Abstract

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