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Main Authors: Lee, Jaeyong, Lee, Kwangmin, Lee, Jaegui, Jo, Seongil
Format: Preprint
Published: 2025
Subjects:
Online Access:https://arxiv.org/abs/2506.15932
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author Lee, Jaeyong
Lee, Kwangmin
Lee, Jaegui
Jo, Seongil
author_facet Lee, Jaeyong
Lee, Kwangmin
Lee, Jaegui
Jo, Seongil
contents In this paper, we study the conditional Dirichlet process (cDP) when a functional of a random distribution is specified. Specifically, we apply the cDP to the functional condition model, a nonparametric model in which a finite-dimensional parameter of interest is defined as the solution to a functional equation of the distribution. We derive both the posterior distribution of the parameter of interest and the posterior distribution of the underlying distribution itself. We establish two general limiting theorems for the posterior: one as the total mass of the Dirichlet process parameter tends to zero, and another as the sample size tends to infinity. We consider two specific models, the quantile model and the moment model, and propose algorithms for posterior computation, accompanied by illustrative data analysis examples. As a byproduct, we show that the Jeffreys substitute likelihood emerges as the limit of the marginal posterior in the functional condition model with a cDP prior, thereby providing a theoretical justification that has so far been lacking.
format Preprint
id arxiv_https___arxiv_org_abs_2506_15932
institution arXiv
publishDate 2025
record_format arxiv
spellingShingle Conditional Dirichlet Processes and Functional Condition Models
Lee, Jaeyong
Lee, Kwangmin
Lee, Jaegui
Jo, Seongil
Statistics Theory
In this paper, we study the conditional Dirichlet process (cDP) when a functional of a random distribution is specified. Specifically, we apply the cDP to the functional condition model, a nonparametric model in which a finite-dimensional parameter of interest is defined as the solution to a functional equation of the distribution. We derive both the posterior distribution of the parameter of interest and the posterior distribution of the underlying distribution itself. We establish two general limiting theorems for the posterior: one as the total mass of the Dirichlet process parameter tends to zero, and another as the sample size tends to infinity. We consider two specific models, the quantile model and the moment model, and propose algorithms for posterior computation, accompanied by illustrative data analysis examples. As a byproduct, we show that the Jeffreys substitute likelihood emerges as the limit of the marginal posterior in the functional condition model with a cDP prior, thereby providing a theoretical justification that has so far been lacking.
title Conditional Dirichlet Processes and Functional Condition Models
topic Statistics Theory
url https://arxiv.org/abs/2506.15932