A new family of holomorphic homogeneous regular domains and some questions on the squeezing function

Abstract

We revisit the phenomenon where, for certain domains D, if the squeezing function sD extends continuously to a point p∈ ∂D with value 1, then ∂D is strongly pseudoconvex around p. In C2, we present weaker conditions under which the latter conclusion is obtained. In another direction, we show that there are bounded domains D Cn, n≥ 2, that admit large ∂D-open subsets O⊂ ∂D such that sD 0 approaching any point in O. This is impossible for planar domains. We pose a few questions related to these phenomena. But the core result of this paper identifies a new family of holomorphic homogeneous regular domains. We show via a family of examples how abundant domains satisfying the conditions of this result are.