Self-duality and the Holomorphic Ansatz in Generalized BPS Skyrme Model

Abstract

We propose a generalization of the BPS Skyrme model for simple compact Lie groups G that leads to Hermitian symmetric spaces. In such a theory, the Skyrme field takes its values in G, while the remaining fields correspond to the entries of a symmetric, positive, and invertible G × G-dimensional matrix h. We also use the holomorphic map ansatz between S2 → G/H × U(1) to study the self-dual sector of the theory, which generalizes the holomorphic ansatz between S2 → CPN. This ansatz is constructed using the fact that stable harmonic maps of the two S2 spheres for compact Hermitian symmetric spaces are holomorphic or anti-holomorphic. Apart from some special cases, the self-duality equations do not fix the matrix h entirely in terms of the Skyrme field, which is completely free, as it happens in the original self-dual Skyrme model for G=SU(2). In general, the freedom of the h fields tend to grow with the dimension of G. The holomorphic ansatz enable us to construct an infinite number of exact self-dual Skyrmions for each integer value of the topological charge and for each value of N ≥ 1, in case of the CPN, and for each values of p,\,q≥ 1 in case of SU(p+q)/SU(p) SU(q) U(1).

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