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Stability of Q-balls and Catastrophe

Abstract

We propose a practical method for analyzing stability of Q-balls for the whole parameter space, which includes the intermediate region between the thin-wall limit and thick-wall limit as well as Q-bubbles (Q-balls in false vacuum), using the catastrophe theory. We apply our method to the two concrete models, V3=m2ϕ2/2−μϕ3+λϕ4V_3=m^2\phi^2/2-\mu\phi^3+\lambda\phi^4 and V4=m2ϕ2/2−λϕ4+ϕ6/M2V_4=m^2\phi^2/2-\lambda\phi^4+\phi^6/M^2. We find that V3V_3 and V4V_4 Models fall into {\it fold catastrophe} and {\it cusp catastrophe}, respectively, and their stability structures are quite different from each other.Comment: 9 pages, 4 figures, some discussions and references added, to apear in Prog. Theor. Phy

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    Last time updated on 01/04/2019