We consider three different approaches to define natural Riemannian metrics on polytopes of stochastic matrices. First, we define a natural class of stochastic maps between these polytopes and give a metric characterization of Chentsov type in terms of invariance with respect to these maps. Second, we consider the Fisher metric defined on arbitrary polytopes through their embeddings as exponential families in the probability simplex. We show that these metrics can also be characterized by an invariance principle with respect to morphisms of exponential families. Third, we consider the Fisher metric resulting from embedding the polytope of stochastic matrices in a simplex of joint distributions by specifying a marginal distribution. All thre...
Abstract. The Fisher informational metric is unique in some sense (it is the only Markovian monotone...
When dealing with a parametric statistical model, a Riemannian manifold can naturally appear by endo...
Abstract. The authors introduce new metrics on the space of pairs of a random variable and a probabi...
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...
In this paper we discuss the construction of differential metrics in probability spaces through entr...
In this paper I discuss the relation between the concept of the Fisher metric and the concept of dif...
The Fisher information matrix induces a metric on parametric spaces of families of probability densi...
In this work we introduce some category-theoretical concepts and techniques to study probability dis...
This paper outlines recent work by the author on infinite-dimensional statistical manifolds, employi...
We consider natural and general exponential families Qmm∈M on ℜd parametrized by the means...
We present a method to generate probability distributions that correspond to metrics obeying partial...
AbstractWe determine Riemannian distances between a large class of multivariate probability densitie...
AbstractThe construction of a distance function between probability distributions is of importance i...
The construction of a distance function between probability distributions is of importance in mathem...
Abstract. The Fisher informational metric is unique in some sense (it is the only Markovian monotone...
When dealing with a parametric statistical model, a Riemannian manifold can naturally appear by endo...
Abstract. The authors introduce new metrics on the space of pairs of a random variable and a probabi...
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...
In this paper we discuss the construction of differential metrics in probability spaces through entr...
In this paper I discuss the relation between the concept of the Fisher metric and the concept of dif...
The Fisher information matrix induces a metric on parametric spaces of families of probability densi...
In this work we introduce some category-theoretical concepts and techniques to study probability dis...
This paper outlines recent work by the author on infinite-dimensional statistical manifolds, employi...
We consider natural and general exponential families Qmm∈M on ℜd parametrized by the means...
We present a method to generate probability distributions that correspond to metrics obeying partial...
AbstractWe determine Riemannian distances between a large class of multivariate probability densitie...
AbstractThe construction of a distance function between probability distributions is of importance i...
The construction of a distance function between probability distributions is of importance in mathem...
Abstract. The Fisher informational metric is unique in some sense (it is the only Markovian monotone...
When dealing with a parametric statistical model, a Riemannian manifold can naturally appear by endo...
Abstract. The authors introduce new metrics on the space of pairs of a random variable and a probabi...