Self-gravitating baryonic tubes supported by π- and ω-mesons and its flat limit
Abstract
In this paper, we construct self-gravitating topological solitons in the SU(N) Einstein non-linear sigma model coupled to ω-vector mesons in four space-time dimensions. These solutions represent tube-like configurations free of curvature singularities, carrying a non-vanishing topological charge that is identified as the baryon number. We show that by employing the maximal embedding Ansatz of SU(2) into SU(N) in the exponential representation, these tubes can be constructed for an arbitrary number of flavors, N, with the topological charge scaling proportionally to this number. The flat-space limit of the solutions, corresponding to an array of baryonic tubes within a finite volume, is analyzed in detail. Remarkably, while the total energy of the solitons at a finite volume is an increasing function of N, the binding energy decreases as the number of flavors increases. This analysis reaffirms that the inclusion of more than two flavors to the model systematically improves the physical predictions.
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