We develope a new and general notion of parametric measure models and statistical models on an arbitrary sample space Ω. This is given by a diffferentiable map from the parameter manifold M into the set of finite measures or probability measures on Ω, respectively, which is differentiable when regarded as a map into the Banach space of all signed measures on Ω. Furthermore, we also give a rigorous definition of roots of measures and give a natural definition of the Fisher metric and the Amari-Chentsov tensor as the pullback of tensors defined on the space of roots of measures. We show that many features such as the preservation of this tensor under sufficient statistics and the monotonicity formula hold even in this very general set-up. MSC...
A systematic introduction to a general nonparametric theory of statistics on manifolds, with emphasi...
Given a compact metric space X, the collection of Borel probability measures on X can be made into a...
Abstract. Given a measurable mapping f from a nonatomic Loeb probability space (T; T; P) to the spac...
We develope a new and general notion of parametric measure models and statistical models on an arbit...
Let $\mathcal{M}_{\mu}$ be the set of all probability densities equivalent to a given reference pro...
In this paper I discuss the relation between the concept of the Fisher metric and the concept of dif...
We consider three different approaches to define natural Riemannian metrics on polytopes of stochast...
We consider three different approaches to define natural Riemannian metrics on polytopes of stochast...
We develop a family of infinite-dimensional (non-parametric) manifolds of probability measures. The...
In this book, the author gives a cohesive account of the theory of probability measures on complete ...
The book provides a comprehensive introduction and a novel mathematical foundation of the field of i...
We first develop in the context of complete metric spaces a oneto- one correspondence between the cl...
We seek to define statistical solutions of hyperbolic systems of conservation laws as time-parametri...
Letµbe a given probability measure andMµ the set ofµ-equivalent strictly positive probability densit...
In this paper we use invariant theory for representations of groups in order to get an indirect meth...
A systematic introduction to a general nonparametric theory of statistics on manifolds, with emphasi...
Given a compact metric space X, the collection of Borel probability measures on X can be made into a...
Abstract. Given a measurable mapping f from a nonatomic Loeb probability space (T; T; P) to the spac...
We develope a new and general notion of parametric measure models and statistical models on an arbit...
Let $\mathcal{M}_{\mu}$ be the set of all probability densities equivalent to a given reference pro...
In this paper I discuss the relation between the concept of the Fisher metric and the concept of dif...
We consider three different approaches to define natural Riemannian metrics on polytopes of stochast...
We consider three different approaches to define natural Riemannian metrics on polytopes of stochast...
We develop a family of infinite-dimensional (non-parametric) manifolds of probability measures. The...
In this book, the author gives a cohesive account of the theory of probability measures on complete ...
The book provides a comprehensive introduction and a novel mathematical foundation of the field of i...
We first develop in the context of complete metric spaces a oneto- one correspondence between the cl...
We seek to define statistical solutions of hyperbolic systems of conservation laws as time-parametri...
Letµbe a given probability measure andMµ the set ofµ-equivalent strictly positive probability densit...
In this paper we use invariant theory for representations of groups in order to get an indirect meth...
A systematic introduction to a general nonparametric theory of statistics on manifolds, with emphasi...
Given a compact metric space X, the collection of Borel probability measures on X can be made into a...
Abstract. Given a measurable mapping f from a nonatomic Loeb probability space (T; T; P) to the spac...