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arxiv: 0805.1979 · v1 · submitted 2008-05-14 · 🧮 math.DG · math-ph· math.MP

Loop Group Decompositions in Almost Split Real Forms and Applications to Soliton Theory and Geometry

classification 🧮 math.DG math-phmath.MP
keywords compactglobalrealalmostapplicationsdecompositiondimensionalforms
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We prove a global Birkhoff decomposition for almost split real forms of loop groups, when an underlying finite dimensional Lie group is compact. Among applications, this shows that the dressing action - by the whole subgroup of loops which extend holomorphically to the exterior disc - on the $U$-hierarchy of the ZS-AKNS systems, on curved flats and on various other integrable systems, is global for compact cases. It also implies a global infinite dimensional Weierstrass-type representation for Lorentzian harmonic maps (1+1 wave maps) from surfaces into compact symmetric spaces. An "Iwasawa-type" decomposition of the same type of real form, with respect to a fixed point subgroup of an involution of the second kind, is also proved, and an application given.

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