A Generalized False Vacuum Skyrme model

Abstract

We propose a generalization of the False Vacuum Skyrme model for any simple compact Lie groups G that leads to Hermitian symmetric spaces. The Skyrme field that in the original theory takes its values in SU(2) Lie group, now takes its values in G, while the remaining fields correspond to the entries of a symmetric, positive, and invertible G × G-dimensional matrix h. This model is also an extension of the generalized BPS Skyrme model. We prove that the global minima correspond to the h fields being self-dual solutions of the generalized BPS Skyrme model, together with a particular field configuration for the Skyrme field that leads to a spherically symmetric topological charge density. As in the case of the original model, the minimization of the energy leads to the so-called reduced problem, defined in the context of false vacuum decay. This imposes a condition on the Skyrme field, which, if satisfied, makes the total energy of the global minima, as well as the main properties of the model, equivalent to those obtained for the G=SU(2) case. We study this condition and its consequences within the generalized rational map ansatz and show how it can be satisfied for G=SU(p+q), where p and q are positive integers, with the Hermitian symmetric spaces being SU(p+q)/SU(p) SU(q) U(1). In such a case, the model is completely equivalent to the G=SU(2) False Vacuum Skyrme model, independent of the values of p and q. We also provide a numerical study of the baryon density, RMS radius, and binding energy per nucleon, which deepens the previous analysis conducted for the SU(2) False Vacuum Skyrme model. Additionaly, in the case of G = SU(3), we have studied the application of our model to the description of the binding energies and masses of the -hypernuclei.