# Geometry of Statistical Manifolds

**Authors:** Paul W. Vos

PMC · DOI: 10.3390/e27111110 · 2025-10-27

## TL;DR

This paper explores the geometric structure of statistical manifolds and introduces a new framework for understanding generalized estimators and their statistical properties.

## Contribution

The paper introduces a Hilbert bundle HM to extend the tangent bundle TM, enabling a geometric interpretation of generalized estimators and their statistical properties.

## Key findings

- The log likelihood and score functions are examples of generalized estimators on statistical manifolds.
- The Λ-information of an estimator gθ^ is bounded by the Fisher information I.
- The geometric perspective is demonstrated through the two-sample problem.

## Abstract

A statistical manifold M can be defined as a Riemannian manifold each of whose points is a probability distribution on the same support. In fact, statistical manifolds possess a richer geometric structure beyond the Fisher information metric defined on the tangent bundle TM. Recognizing that points in M are distributions and not just generic points in a manifold, TM can be extended to a Hilbert bundle HM. This extension proves fundamental when we generalize the classical notion of a point estimate—a single point in M—to a function on M that characterizes the relationship between observed data and each distribution in M. The log likelihood and score functions are important examples of generalized estimators. In terms of a parameterization θ:M→Θ⊂Rk, θ^ is a distribution on Θ while its generalization gθ^=θ^−Eθ^ as an estimate is a function over Θ that indicates inconsistency between the model and data. As an estimator, gθ^ is a distribution of functions. Geometric properties of these functions describe statistical properties of gθ^. In particular, the expected slopes of gθ^ are used to define Λ(gθ^), the Λ-information of gθ^. The Fisher information I is an upper bound for the Λ-information: for all g, Λ(g)≤I. We demonstrate the utility of this geometric perspective using the two-sample problem.

## Full-text entities

- **Diseases:** laryngeal carcinoma (MESH:D007822), Cancer (MESH:D009369), injury to (MESH:D014947)
- **Species:** Homo sapiens (human, species) [taxon 9606]

## Figures

2 figures with captions in the complete paper: https://tomesphere.com/paper/PMC12650832/full.md

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Source: https://tomesphere.com/paper/PMC12650832