The full automorphism group of T
Abstract
Let G be the wonderful compactification of a simple affine algebraic group G of adjoint type defined over C. Let T⊂ G be the closure of a maximal torus T⊂ G. We prove that the group of all automorphisms of the variety T is the semi-direct product NG(T) D, where NG(T) is the normalizer of T in G and D is the group of all automorphisms of the Dynkin diagram, if G= PSL(2,C). Note that if G = PSL(2,C), then T = C P1 and so in this case Aut( T)= PSL(2,C).
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