Geodesic motion in Euclidean Schwarzschild geometry

Emmanuele Battista; Giampiero Esposito

doi:10.1140/epjc/s10052-022-11070-w

European Physical Journal C: Particles and Fields (Dec 2022)

Geodesic motion in Euclidean Schwarzschild geometry

Emmanuele Battista,
Giampiero Esposito

Affiliations

Emmanuele Battista: Department of Physics, University of Vienna
Giampiero Esposito: Dipartimento di Fisica “Ettore Pancini”, Complesso Universitario di Monte S. Angelo, Università degli Studi di Napoli “Federico II”

DOI: https://doi.org/10.1140/epjc/s10052-022-11070-w
Journal volume & issue: Vol. 82, no. 12
pp. 1 – 13

Abstract

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Abstract This paper performs a systematic investigation of geodesic motion in Euclidean Schwarzschild geometry, which is studied in the equatorial plane. The explicit form of geodesic motion is obtained in terms of incomplete elliptic integrals of first, second and third kind. No elliptic-like orbits exist in Euclidean Schwarzschild geometry, unlike the corresponding Lorentzian pattern. Among unbounded orbits, only unbounded first-kind orbits are allowed, unlike general relativity where unbounded second-kind orbits are always allowed.

Published in European Physical Journal C: Particles and Fields

ISSN: 1434-6044 (Print); 1434-6052 (Online)
Publisher: SpringerOpen
Country of publisher: Germany
LCC subjects: Science: Astronomy: Astrophysics; Science: Physics: Nuclear and particle physics. Atomic energy. Radioactivity
Website: http://www.springer.com/physics/particle+and+nuclear+physics/journal/10052

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