Orbits of tori extended by finite groups and their polynomial hulls: the case of connected complex orbits

Abstract

Let V be a complex linear space, G⊂(V) be a compact group. We consider the problem of description of polynomial hulls Gv for orbits Gv, v∈ V, assuming that the identity component of G is a torus T. The paper contains a universal construction for orbits which satisfy the inclusion Gv⊂ T v and a characterization of pairs (G,V) such that it is true for a generic v∈ V. The hull of a finite union of T-orbits in T v can be distinguished in T v by a finite collection of inequalities of the type z1s1...znsn≤ c. In particular, this is true for Gv. If powers in the monomials are independent of v, Gv⊂ T v for a generic v, and either the center of G is finite or T has an open orbit, then the space V and the group G are products of standard ones; the latter means that G=SnT, where Sn is the group of all permutations of coordinates and T is either n or (n)n, where n is the torus of all diagonal matrices in (n). The paper also contains a description of polynomial hulls for orbits of isotropy groups of bounded symmetric domains. This result is already known, but we formulate it in a different form and supply with a shorter proof.