English

Bayesian nonparametric inference on a Fr\'echet class

Methodology 2025-02-25 v1

Abstract

Let (X,F,μ)(\mathcal{X},\mathcal{F},\mu) and (Y,G,ν)(\mathcal{Y},\mathcal{G},\nu) be probability spaces and (Zn)(Z_n) a sequence of random variables with values in (X×Y,FG)(\mathcal{X}\times\mathcal{Y},\,\mathcal{F}\otimes\mathcal{G}). Let Γ(μ,ν)\Gamma(\mu,\nu) be the collection of all probability measures pp on FG\mathcal{F}\otimes\mathcal{G} such that p(A×Y)=μ(A)andp(X×B)=ν(B)for all AF and BG.p\bigl(A\times\mathcal{Y}\bigr)=\mu(A)\quad\text{and}\quad p\bigl(\mathcal{X}\times B\bigr)=\nu(B)\quad\text{for all }A\in\mathcal{F}\text{ and }B\in\mathcal{G}. In this paper, we build some probability measures Π\Pi on Γ(μ,ν)\Gamma(\mu,\nu). In addition, for each such Π\Pi, we assume that (Zn)(Z_n) is exchangeable with de Finetti's measure Π\Pi and we evaluate the conditional distribution Π(Z1,,Zn)\Pi(\cdot\mid Z_1,\ldots,Z_n). In Bayesian nonparametrics, if (Z1,,Zn)(Z_1,\ldots, Z_n) are the available data, Π\Pi and Π(Z1,,Zn)\Pi(\cdot\mid Z_1,\ldots, Z_n) can be regarded as the prior and the posterior, respectively. To support this interpretation, it suffices to think of a problem where the unknown probability distribution of some bivariate phenomenon is constrained to have marginals μ\mu and ν\nu. Finally, analogous results are obtained for the set Γ(μ)\Gamma(\mu) of those probability measures on FG\mathcal{F}\otimes\mathcal{G} with marginal μ\mu on F\mathcal{F} (but arbitrary marginal on G\mathcal{G}). That is, we introduce some priors on Γ(μ)\Gamma(\mu) and we evaluate the corresponding posteriors.

Cite

@article{arxiv.2502.16192,
  title  = {Bayesian nonparametric inference on a Fr\'echet class},
  author = {Emanuela Dreassi and Luca Pratelli and Pietro Rigo},
  journal= {arXiv preprint arXiv:2502.16192},
  year   = {2025}
}

Comments

16 pages

R2 v1 2026-06-28T21:53:57.944Z