Statistical Bergman geometry

Abstract

This paper explores the Bergman geometry of bounded domains in Cn through the lens of information geometry by introducing a mapping : → P(), where P() denotes a space of probability measures on . A result by J. Burbea and C. Rao establishes that the pullback of the Fisher information metric, the fundamental Riemannian pseudo-metric in information geometry, via coincides with the Bergman metric of . Building on this idea, we consider as a statistical model and present several interesting results within this framework. First, we derive a new statistical curvature formula for the Bergman metric by expressing it in terms of covariance. Second, given a proper holomorphic map f: 1 → 2, we prove that if the induced measure push-forward : P(1) → P(2) preserves the Fisher information metrics, then f must be a biholomorphism. Finally, we establish the consistency and the central limit theorem of the Fr\'echet sample mean for Calabi's diastasis function.