2-proper holomorphic images of classical Cartan domains

Abstract

Motivated by the way two special domains, namely the symmetrized bidisc and the tetrablock, could be defined as the images of 2-proper holomorphic images of classical Cartan domains, we present a general approach to study 2-proper holomorphic images of bounded symmetric domains. We show some special properties of 2-proper holomorphic maps (such as the construction of some blackinvolutive automorphisms etc.) and enlist possible domains (up to biholomorphisms) which arise as 2-proper holomorphic images of bounded symmetric domains. This leads us to a consideration of a new family of domains Ln for n≥ 2. Let Ln be an irreducible classical Cartan domain of type IV (Lie ball) of dimension n and n : Ln n (Ln):= Ln be the natural proper holomorphic mapping of multiplicity 2. It turns out that L2 and L3 are biholomorphic to the symmetrized bidisc and the tetrablock, respectively. In this article, we study function geometric properties of the family \ Ln : n ≥ 2\ in a unified manner and thus extend results of many earlier papers on analogous properties of the symmetrized bidisc and the tetrablock. We show that Ln cannot be exhausted by domains biholomorhic to some convex domains. Any proper holomorphic self-mapping of Ln is an automorphism for n ≥ 3. Moreover, the automorphism group Aut( Ln) is isomorphic to Aut( Ln-1) and Ln is inhomogeneous for blackn≥2. Additionally, we prove that Ln is not a Lu Qi-Keng domain for n ≥ 3.omogeneous for n≥3. Additionally, we prove that Ln is not a Lu Qi-Keng domain for n ≥ 3.