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Domaines de $${\mathbb{C}}^ 2$$, pseudoconvexes et de type fini ayant un groupe non compact d’automorphismes. (On domains in $${\mathbb{C}}^ 2$$, being pseudoconvex and of finite type, with non-compact automorphism group). (French) Zbl 0711.32016
It is shown that a bounded pseudo-convex domain in $${\mathbb{C}}^ 2$$, with smooth boundary and finite type, which has a non-compact automorphism group, is biholomorphically equivalent to a domain $$\{Re w+P(z)<0\}$$ where P is polynomial, subharmonic, with degree less than the type of the boundary.

##### MSC:
 32M99 Complex spaces with a group of automorphisms 32T99 Pseudoconvex domains 32A17 Special families of functions of several complex variables
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##### References:
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