Harmonic, Holomorphic and Rational Maps from Self-Duality

Abstract

We propose a generalization of the so-called rational map ansatz on the Euclidean space R3, for any compact simple Lie group G such that G/ K U(1) is an Hermitian symmetric space, for some subgroup K of G. It generalizes the rational maps on the two-sphere SU(2)/U(1), and also on CPN=SU(N+1)/SU(N) U(1), and opens up the way for applications of such ans\"atze on non-linear sigma models, Skyrme theory and magnetic monopoles in Yang-Mills-Higgs theories. Our construction is based on a well known mathematical result stating that stable harmonic maps X from the two-sphere S2 to compact Hermitian symmetric spaces G/ K U(1) are holomorphic or anti-holomorphic. We derive such a mathematical result using ideas involving the concept of self-duality, in a way that makes it more accessible to theoretical physicists. Using a topological (homotopic) charge that admits an integral representation, we construct first order partial differential self-duality equations such that their solutions also solve the (second order) Euler-Lagrange associated to the harmonic map energy E=∫S2 dX2 dμ. We show that such solutions saturate a lower bound on the energy E, and that the self-duality equations constitute the Cauchy-Riemann equations for the maps X. Therefore, they constitute harmonic and (anti)holomorphic maps, and lead to the generalization of the rational map ans\"atze in R3. We apply our results to construct approximate Skyrme solutions for the SU(N) Skyrme model.

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