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Pis'ma v Zhurnal Èksperimental'noi i Teoreticheskoi Fiziki, 2004, Volume 79, Issue 5, Pages 262–266
(Mi jetpl2241)
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This article is cited in 11 scientific papers (total in 11 papers)
NONLINEAR DYNAMICS
Self-compression and catastrophic collapse of photon bullets in vacuum
M. Marklunda, B. Eliassonb, P. K. Shuklabc a Department of Electromagnetics, Chalmers University of Technology, SE-412 96 Göteborg, Sweden
b Fakultät für Physik und Astronomie, Ruhr-Universität Bochum, D-44780 Bochum, Germany
c Department of Physics, Umeå University, SE-901 87 Umeå, Sweden
Abstract:
Photon–photon scattering, due to photons interacting with virtual electron–positron pairs, is an intriguing deviation from classical electromagnetism predicted by quantum electrodynamics (QED). Apart from being of fundamental interest in itself, collisions between photons are believed to be of importance in the vicinity of magnetars, in the present generation intense lasers, and in intense laser-plasma/matter interactions; the latter recreating astrophysical conditions in the laboratory. We show that an intense photon pulse propagating through a radiation gas can self-focus, and under certain circumstances collapse. This is due to the response of the radiation background, creating a potential well in which the pulse gets trapped, giving rise to photonic solitary structures. When the radiation gas intensity has reached its peak values, the gas releases part of its energy into ‘photon wedges’, similar to Cherenkov radiation. The results should be of importance for the present generation of intense lasers and for the understanding of localized gamma ray bursts in astrophysical environments. They could furthermore test the predictions of QED, and give means to create ultra-intense photonic pulses.
Received: 05.01.2004
Citation:
M. Marklund, B. Eliasson, P. K. Shukla, “Self-compression and catastrophic collapse of photon bullets in vacuum”, Pis'ma v Zh. Èksper. Teoret. Fiz., 79:5 (2004), 262–266; JETP Letters, 79:5 (2004), 208–212
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https://www.mathnet.ru/eng/jetpl2241 https://www.mathnet.ru/eng/jetpl/v79/i5/p262
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Abstract page: | 203 | Full-text PDF : | 53 | References: | 53 |
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