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We give an explicit lower bound, in terms of the distance from the boundary, for the Kobayashi metric of a certain class of bounded pseudoconvex domains in Cⁿ with C²-smooth boundary using the regularity theory for the complex Monge--Ampere equation. Using such an estimate, we construct a family of unbounded Kobayashi hyperbolic domains in Cⁿ having a certain negative-curvature-type property with respect to the Kobayashi distance. As an application, we prove a Picard-type extension theorem for the latter domains.
Banik et al. (Thu,) studied this question.