Add to ORKGA new mathematical object called a preferred point geometry is introduced in order to (a) provide a natural geometric framework in which to do statistical inference and (b) reflect the distinction between homogeneous aspects (e.g., any point theta may be the true parameter) and preferred point ones (e.g., when theta0 is the true parameter). Although preferred point geometry is applicable generally in statistics, we focus here on its relationship to statistical manifolds, in particular to Amari's expected geometry. A symmetry condition characterises when a preferred point geometry both subsumes a statistical manifold and, simultaneously, generalises it to arbitrary order. There are corresponding links with Barndorff-Nielsen's strings. The ra...
A statistical manifold is a Riemannian manifold endowed with a torsion-free affine connection satisf...
We study the statistical theory of shape for ordered finite point configurations, or otherwise state...
A statistical model M is a family of probability distributions, characterised by a set of continuous...
A new mathematical object called a preferred point geometry is introduced in order to (a) provide a ...
Abstract. A brief synopsis of progress in differential geometry in statistics is followed by a note ...
A brief synopsis of progress in differential geometry in statistics is followed by a note of some po...
Chapters 1 and 2 are both surveys of the current work in applying geometry to statistics. Chapter 1...
A new preferred point geometric structure for statistical analysis, closely related to Amari's alpha...
Abstract. The condition for the curvature of a statistical man-ifold to admit a kind of standard hyp...
AbstractThe condition for the curvature of a statistical manifold to admit a kind of standard hypers...
A systematic introduction to a general nonparametric theory of statistics on manifolds, with emphasi...
The structure of semiparametric statistical models is elucidated by information geometry. The paper ...
This thesis will take a look at the roots of modern-day information geometry and some applications i...
Geometry plays an important role in modern statistical learning theory, and many different aspects o...
Asymmetric information distances are used to define asymmetric norms and quasimetrics on the statist...
A statistical manifold is a Riemannian manifold endowed with a torsion-free affine connection satisf...
We study the statistical theory of shape for ordered finite point configurations, or otherwise state...
A statistical model M is a family of probability distributions, characterised by a set of continuous...
A new mathematical object called a preferred point geometry is introduced in order to (a) provide a ...
Abstract. A brief synopsis of progress in differential geometry in statistics is followed by a note ...
A brief synopsis of progress in differential geometry in statistics is followed by a note of some po...
Chapters 1 and 2 are both surveys of the current work in applying geometry to statistics. Chapter 1...
A new preferred point geometric structure for statistical analysis, closely related to Amari's alpha...
Abstract. The condition for the curvature of a statistical man-ifold to admit a kind of standard hyp...
AbstractThe condition for the curvature of a statistical manifold to admit a kind of standard hypers...
A systematic introduction to a general nonparametric theory of statistics on manifolds, with emphasi...
The structure of semiparametric statistical models is elucidated by information geometry. The paper ...
This thesis will take a look at the roots of modern-day information geometry and some applications i...
Geometry plays an important role in modern statistical learning theory, and many different aspects o...
Asymmetric information distances are used to define asymmetric norms and quasimetrics on the statist...
A statistical manifold is a Riemannian manifold endowed with a torsion-free affine connection satisf...
We study the statistical theory of shape for ordered finite point configurations, or otherwise state...
A statistical model M is a family of probability distributions, characterised by a set of continuous...