Add to ORKGLinear spaces consisting of -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.Peer Reviewe
In this paper we characterize the continuous linear sufficient statistics for a dominated collection...
We introduce a set of transformations on the set of all probability distributions over a finite stat...
Assuming that the sample space is discrete and sampling distributions assign positive probability to...
Linear spaces consisting of $\sigma$-finite probability measures and infinite measures (improper pri...
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 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 ...
An abstract definition of probability can be given by considering a set S, called the sample space, ...
This is not a copy of the original, which is in the University of Washington library because the or...
The Aitchison vector space structure for the simplex is generalized to a Hilbert space structure A2(...
The Aitchison vector space structure for the simplex is generalized to a Hilbert space structure A2(...
In this paper we characterize the continuous linear sufficient statistics for a dominated collection...
We introduce a set of transformations on the set of all probability distributions over a finite stat...
Assuming that the sample space is discrete and sampling distributions assign positive probability to...
Linear spaces consisting of $\sigma$-finite probability measures and infinite measures (improper pri...
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 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 ...
An abstract definition of probability can be given by considering a set S, called the sample space, ...
This is not a copy of the original, which is in the University of Washington library because the or...
The Aitchison vector space structure for the simplex is generalized to a Hilbert space structure A2(...
The Aitchison vector space structure for the simplex is generalized to a Hilbert space structure A2(...
In this paper we characterize the continuous linear sufficient statistics for a dominated collection...
We introduce a set of transformations on the set of all probability distributions over a finite stat...
Assuming that the sample space is discrete and sampling distributions assign positive probability to...