A metric version of Poincar\'e's theorem concerning biholomorphic inequivalence of domains

Abstract

We show that if Yj⊂ Cnj is a bounded strongly convex domain with C3-boundary for j=1,…,q, and Xj⊂ Cmj is a bounded convex domain for j=1,…,p, then the product domain Πj=1p Xj⊂ Cm cannot be isometrically embedded into Πj=1q Yj⊂ Cn under the Kobayashi distance, if p>q. This result generalises Poincar\'e's theorem which says that there is no biholomorphic map from the polydisc onto the Euclidean ball in Cn for n≥ 2. The method of proof only relies on the metric geometry of the spaces and will be derived from a result for products of proper geodesic metric spaces with the sup-metric. In fact, the main goal of the paper is to establish a general criterion, in terms of certain asymptotic geometric properties of the individual metric spaces, that yields an obstruction for the existence of an isometric embedding between product metric spaces.