Add to ORKGLinear spaces consisting of $\sigma$-finite probability measures and infinite measures (improper priors and likelihood functions) are defined. The commutative group operation, called perturbation, is the updating given by Bayes theorem; the inverse operation is the Radon-Nikodym derivative. Bayes spaces of measures are sets of classes of proportional measures. In this framework, basic notions of mathematical statistics get a simple algebraic interpretation. For example, exponential families appear as affine subspaces with their sufficient statistics as a basis. Bayesian statistics, in particular some well-known properties of conjugated priors and likelihood functions, are revisited and slightly extended
The ultraproducts of measurable linear spaces with probability measure are considered. We study some...
The ultraproducts of measurable linear spaces with probability measure are considered. We study some...
AbstractIn a recent paper, probabilistic processes are used to generate Borel probability measures o...
Linear spaces consisting of $\sigma$-finite probability measures and infinite measures (improper pri...
Linear spaces consisting of o-finite probability measures and infinite measures (improper priors and...
Linear spaces consisting of -finite probability measures and infinite measures (improper priors an...
Linear spaces consisting of σ-finite probability measures and infinite measures (improper priors and l...
A Bayes linear space is a linear space of equivalence classes of proportional σ-finite measures, inc...
In a given problem, the Bayesian statistical paradigm requires the specification of a prior distribu...
In [14] we formalized probability and probability distribution on a finite sample space. In this art...
This paper considers a new class \Gamma specified under uncertainty on the relative weights of some ...
Assuming that the sample space is discrete and sampling distributions assign positive probability to...
In this paper we characterize the continuous linear sufficient statistics for a dominated collection...
An abstract definition of probability can be given by considering a set S, called the sample space, ...
The Aitchison vector space structure for the simplex is generalized to a Hilbert space structure A2(...
The ultraproducts of measurable linear spaces with probability measure are considered. We study some...
The ultraproducts of measurable linear spaces with probability measure are considered. We study some...
AbstractIn a recent paper, probabilistic processes are used to generate Borel probability measures o...
Linear spaces consisting of $\sigma$-finite probability measures and infinite measures (improper pri...
Linear spaces consisting of o-finite probability measures and infinite measures (improper priors and...
Linear spaces consisting of -finite probability measures and infinite measures (improper priors an...
Linear spaces consisting of σ-finite probability measures and infinite measures (improper priors and l...
A Bayes linear space is a linear space of equivalence classes of proportional σ-finite measures, inc...
In a given problem, the Bayesian statistical paradigm requires the specification of a prior distribu...
In [14] we formalized probability and probability distribution on a finite sample space. In this art...
This paper considers a new class \Gamma specified under uncertainty on the relative weights of some ...
Assuming that the sample space is discrete and sampling distributions assign positive probability to...
In this paper we characterize the continuous linear sufficient statistics for a dominated collection...
An abstract definition of probability can be given by considering a set S, called the sample space, ...
The Aitchison vector space structure for the simplex is generalized to a Hilbert space structure A2(...
The ultraproducts of measurable linear spaces with probability measure are considered. We study some...
The ultraproducts of measurable linear spaces with probability measure are considered. We study some...
AbstractIn a recent paper, probabilistic processes are used to generate Borel probability measures o...