Exact solutions ofG-invariant chiral equations
Copyright policy )Exact solutions ofG-invariant chiral equations
We give a methodology for solving the chiral equations $(αg_{,z} g^{-1})_{,\overline z} + (αg_{,\overline z} g^{-1})_{,z} \ = \ 0 $ where $g$ belongs to some Lie group $G$. The solutions are writing in terms of Harmonic maps. The method could be used even for some infinite Lie groups. (Preprint CIEA-gr-94/06)
8 TeX pages. Seminar presented at the First Mexican-Russian Meeting on Mathematical Physics, Mexico city, 1993
Applications of differential geometry to physics, High Energy Physics - Theory, High Energy Physics - Theory (hep-th), harmonic maps, FOS: Physical sciences, Exact solutions to problems in general relativity and gravitational theory, chiral equations, Harmonic maps, etc.
Applications of differential geometry to physics, High Energy Physics - Theory, High Energy Physics - Theory (hep-th), harmonic maps, FOS: Physical sciences, Exact solutions to problems in general relativity and gravitational theory, chiral equations, Harmonic maps, etc.
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