BLASCHKE, Petr. Pedal Coordinates and Orbits Inside Magnetic Dipole Field. In Piotr Kielanowski, Alina Dobrogowska, Gerald A. Goldin, Tomasz Goliński. Geometric Methods in Physics XXXIX, Trends in Mathematics. Cham, Switzerland: Birkhäuser Cham, 2023, p. 147-158. ISBN 978-3-031-30286-2. Available from: https://dx.doi.org/10.1007/978-3-031-30284-8_14.
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Basic information
Original name Pedal Coordinates and Orbits Inside Magnetic Dipole Field
Authors BLASCHKE, Petr (203 Czech Republic, guarantor, belonging to the institution).
Edition Cham, Switzerland, Geometric Methods in Physics XXXIX, Trends in Mathematics, p. 147-158, 12 pp. 2023.
Publisher Birkhäuser Cham
Other information
Original language English
Type of outcome Proceedings paper
Field of Study 10101 Pure mathematics
Country of publisher Switzerland
Confidentiality degree is not subject to a state or trade secret
Publication form printed version "print"
WWW Geometric Methods in Physics XXXIX
RIV identification code RIV/47813059:19610/23:A0000126
Organization unit Mathematical Institute in Opava
ISBN 978-3-031-30286-2
ISSN 2297-0215
Doi http://dx.doi.org/10.1007/978-3-031-30284-8_14
Keywords in English Calculus of variation; Classical mechanics; Integrable system; Pedal coordinates; Systems of Frenet–Serret type
Tags
Tags International impact, Reviewed
Links GA21-27941S, research and development project.
Changed by Changed by: Mgr. Aleš Ryšavý, učo 28000. Changed: 27/3/2024 15:00.
Abstract
We will compare two different techniques to solve a problem of motion of a charged particle inside magnetic dipole field. One “classical” and the other using pedal coordinates. We will show that even though the classical approach gives an exact solution in terms of known function, pedal coordinates offer much better understanding of the solution and also offer a mean to manipulate the obtained orbits in order to be able to link them with existing curves and other force problems.
PrintDisplayed: 28/4/2024 02:22