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Main Authors: Ohnishi, Yuki, Li, Fan
Format: Preprint
Published: 2026
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Online Access:https://arxiv.org/abs/2604.23851
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author Ohnishi, Yuki
Li, Fan
author_facet Ohnishi, Yuki
Li, Fan
contents Change-plane regression identifies subpopulations through an interpretable linear threshold rule, but likelihood-based inference for the hard-threshold boundary is nonregular: objectives are non-smooth, the boundary is weakly identified under no heterogeneity, and standard large-sample approximations are fragile. We develop a new Bayesian inferential framework based on a probit-gated working likelihood -- a computationally regular surrogate that is deliberately misspecified for any fixed smoothing scale. For fixed smoothing, posterior summaries are therefore interpreted for a well-defined smoothed pseudo-true target; inference for the hard-threshold target is recovered only in a vanishing-smoothing regime, where approximation bias is governed by a boundary-margin condition on the covariate distribution. The resulting theory adapts misspecified Bernstein--von Mises arguments to Bayesian change-plane regression and makes explicit the triangular-array trade-off created by sending the smoothing scale to zero: sharper gates worsen the derivative bounds needed for Gaussian approximation, while approximation bias decreases according to the local amount of covariate mass near the boundary. Building on the resulting joint posterior, we further propose a decision-theoretic reporting protocol that separates evidence for clinically meaningful heterogeneity from the reporting of a subgroup boundary, with boundary uncertainty propagated to the covariate level through posterior membership probabilities. Simulations show favorable accuracy and uncertainty quantification of our new methods relative to the frequentist counterpart, and an application to a randomized lifestyle-intervention trial further demonstrates the utility of Bayesian change-plane regression in understanding treatment effect heterogeneity.
format Preprint
id arxiv_https___arxiv_org_abs_2604_23851
institution arXiv
publishDate 2026
record_format arxiv
spellingShingle Bayesian change-plane regression
Ohnishi, Yuki
Li, Fan
Methodology
Statistics Theory
Change-plane regression identifies subpopulations through an interpretable linear threshold rule, but likelihood-based inference for the hard-threshold boundary is nonregular: objectives are non-smooth, the boundary is weakly identified under no heterogeneity, and standard large-sample approximations are fragile. We develop a new Bayesian inferential framework based on a probit-gated working likelihood -- a computationally regular surrogate that is deliberately misspecified for any fixed smoothing scale. For fixed smoothing, posterior summaries are therefore interpreted for a well-defined smoothed pseudo-true target; inference for the hard-threshold target is recovered only in a vanishing-smoothing regime, where approximation bias is governed by a boundary-margin condition on the covariate distribution. The resulting theory adapts misspecified Bernstein--von Mises arguments to Bayesian change-plane regression and makes explicit the triangular-array trade-off created by sending the smoothing scale to zero: sharper gates worsen the derivative bounds needed for Gaussian approximation, while approximation bias decreases according to the local amount of covariate mass near the boundary. Building on the resulting joint posterior, we further propose a decision-theoretic reporting protocol that separates evidence for clinically meaningful heterogeneity from the reporting of a subgroup boundary, with boundary uncertainty propagated to the covariate level through posterior membership probabilities. Simulations show favorable accuracy and uncertainty quantification of our new methods relative to the frequentist counterpart, and an application to a randomized lifestyle-intervention trial further demonstrates the utility of Bayesian change-plane regression in understanding treatment effect heterogeneity.
title Bayesian change-plane regression
topic Methodology
Statistics Theory
url https://arxiv.org/abs/2604.23851