On the automorphism groups of algebraic bounded domains
Abstract
Let D be a bounded domain in Cn. By the theorem of H.~Cartan, the group Aut(D) of all biholomorphic automorphisms of D has a unique structure of a real Lie group such that the action Aut(D)× D D is real analytic. This structure is defined by the embedding Cv Aut(D) D× Gln(C), f (f(v), f*v), where v∈ D is arbitrary. Here we restrict our attention to the class of domains D defined by finitely many polynomial inequalities. The appropriate category for studying automorphism of such domains is the Nash category. Therefore we consider the subgroup Auta(D)⊂ Aut(D) of all algebraic biholomorphic automorphisms which in many cases coincides with Aut(D). Assume that n>1 and D has a boundary point where the Levi form is non-degenerate. Our main result is theat the group Auta(D) carries a unique structure of an affine Nash group such that the action Auta(D)× D D is Nash. This structure is defined by the embedding Cv Auta(D) D× Gln(C) and is independent of the choice of v∈ D.
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