Regularity properties of intrinsic objects for a large class of Stein Manifolds, namely of Monge-Ampere exhaustions and Kobayashi distance, is interpreted in terms of modular data. The results lead to a construction of an infinite dimensional family of convex domains with squared Kobayashi distance of prescribed regularity properties. A new sharp refinement of Stoll's characterization of C^n is also given.
Modular data and regularity of Monge–Ampère exhaustions and of Kobayashi distance
SPIRO, Andrea
2014-01-01
Abstract
Regularity properties of intrinsic objects for a large class of Stein Manifolds, namely of Monge-Ampere exhaustions and Kobayashi distance, is interpreted in terms of modular data. The results lead to a construction of an infinite dimensional family of convex domains with squared Kobayashi distance of prescribed regularity properties. A new sharp refinement of Stoll's characterization of C^n is also given.File in questo prodotto:
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