Abstract
AbstractIn Ghosh and Zwonek (2-proper holomorphic images of classical Cartan domains. https://doi.org/10.48550/arXiv.2303.11940) introduced a new class of domains $${{\mathbb {L}}}_n$$ L n , $$n\ge 1$$ n ≥ 1 , which are 2-proper holomorphic images of the Cartan domains of type four. This family contains biholomorphic images of the symmetrized bidisc and the tetrablock. It is well-known, that symmetrized bidisc and tetrablock are Lempert domains. In our paper we show that the whole family of domains $${{\mathbb {L}}}_n$$ L n are Lempert domains.
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