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Main Authors: Azizi, Azizollah, Parkami, Shaghayegh
Format: Preprint
Published: 2024
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Online Access:https://arxiv.org/abs/2407.17066
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author Azizi, Azizollah
Parkami, Shaghayegh
author_facet Azizi, Azizollah
Parkami, Shaghayegh
contents Coupling the fields may lead to the emergence of new phenomena. In the realm of classical fields and nonlinear systems, extensive research has been conducted on their solitary and soliton solutions. In the conducted studies, typically two $ϕ^4$ systems, or two sine-Gordon systems, have been coupled. The sine-Gordon system exhibits diverse solutions, all well-behaved, with its soliton solutions fully understood. On the other hand, the $ϕ^4$ system, which is significant in field theory, has solitary solutions, but these solutions are not solitonic. For example, from a pair of kink and antikink, we cannot construct a bound state; or that after a collision, these two solutions do not revert to their initial status and become disrupted. In this study, we couple a $ϕ^4$ system with a sine-Gordon system to impart stability from the sine-Gordon system to the $ϕ^4$ system. We have demonstrated that for a coupled $ϕ^4$ and sine-Gordon system, this expectation is somewhat met.
format Preprint
id arxiv_https___arxiv_org_abs_2407_17066
institution arXiv
publishDate 2024
record_format arxiv
spellingShingle Coupled Sine-Gordon and $ϕ^4$ System
Azizi, Azizollah
Parkami, Shaghayegh
High Energy Physics - Theory
Mathematical Physics
Coupling the fields may lead to the emergence of new phenomena. In the realm of classical fields and nonlinear systems, extensive research has been conducted on their solitary and soliton solutions. In the conducted studies, typically two $ϕ^4$ systems, or two sine-Gordon systems, have been coupled. The sine-Gordon system exhibits diverse solutions, all well-behaved, with its soliton solutions fully understood. On the other hand, the $ϕ^4$ system, which is significant in field theory, has solitary solutions, but these solutions are not solitonic. For example, from a pair of kink and antikink, we cannot construct a bound state; or that after a collision, these two solutions do not revert to their initial status and become disrupted. In this study, we couple a $ϕ^4$ system with a sine-Gordon system to impart stability from the sine-Gordon system to the $ϕ^4$ system. We have demonstrated that for a coupled $ϕ^4$ and sine-Gordon system, this expectation is somewhat met.
title Coupled Sine-Gordon and $ϕ^4$ System
topic High Energy Physics - Theory
Mathematical Physics
url https://arxiv.org/abs/2407.17066