Asymptotic behaviour of holomorphic extensions of matrix coefficients at the boundary of the complex crown domain

In this paper, we provide a simpler proof of the Kr\"otz--Stanton Extension Theorem for holomorphic extensions of orbit maps in unitary irreducible representations of connected semisimple Lie groups. Our result is a generalization of the previous result as it applies to Hilbert globalizations of finitely generated admissible (g, K) -modules for arbitrary connected semisimple Lie groups G with not necessarily finite center. Furthermore, we give polynomial growth estimates for the norms of the holomorphic extensions of the orbit maps of K-finite vectors in irreducible unitary representations. We use this to prove that, at the boundary of the principal crown bundle, these holomorphic extensions have boundary values in the space of distribution vectors.