Friday, September 7, 2012

1209.1383 (Shabnam Beheshti et al.)

Integrability and Vesture for Harmonic Maps into Symmetric Spaces    [PDF]

Shabnam Beheshti, A. Shadi Tahvildar-Zadeh
After giving the most general formulation to date of the notion of integrability for axially symmetric harmonic maps from R^3 into symmetric spaces, we give a complete and rigorous proof that, subject to some mild restrictions on the target, all such maps are integrable. Furthermore, we prove that the inverse scattering mechanism can always be used to generate new solutions for the harmonic map equations starting from any given solution. In particular we show that the problem of finding N-solitonic harmonic maps into a noncompact Grassmann manifold SU(p, q)/S(U(p) x U(q)) is completely reducible via the vesture (dressing) method to a problem in linear algebra, which we then prove is uniquely solvable. We illustrate this method by explicitly computing a 1-solitonic harmonic map for the two cases (p = 1, q = 1) and (p = 2, q = 1), and we show that the family of solutions obtained in each case contains respectively the Kerr family of solutions to the Einstein vacuum equations, and the Kerr-Newman family of solutions to the Einstein-Maxwell equations.
View original: http://arxiv.org/abs/1209.1383

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