Hierarchical Bayesian spectral regression with shape constraints for multi-group data

We propose a hierarchical Bayesian (HB) model for multi-group analysis with group–specific, flexible regression functions. The lower–level (within group) and upper–level (between groups) regression functions have hierarchical Gaussian process priors. HB smoothing priors are developed for the spectra...

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Bibliographic Details
Published in:Computational statistics & data analysis 2024-12, Vol.200, p.108036, Article 108036
Main Authors: Lenk, Peter, Lee, Jangwon, Han, Dongu, Park, Jichan, Choi, Taeryon
Format: Article
Language:English
Subjects:
B-splines
Group-specific curves
Hierarchical Bayes
Orthogonal polynomials
Pooling information
Shape constraints
Sparse data
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Summary:We propose a hierarchical Bayesian (HB) model for multi-group analysis with group–specific, flexible regression functions. The lower–level (within group) and upper–level (between groups) regression functions have hierarchical Gaussian process priors. HB smoothing priors are developed for the spectral coefficients. The HB priors smooth the estimated functions within and between groups. The HB model is particularly useful when data within groups are sparse because it shares information across groups, and provides more accurate estimates than fitting separate nonparametric models to each group. The proposed model also allows shape constraints, such as monotone, U and S–shaped, and multi-modal constraints. When appropriate, shape constraints improve estimation by recognizing violations of the shape constraints as noise. The model is illustrated by two examples: monotone growth curves for children, and happiness as a convex, U-shaped function of age in multiple countries. Various basis functions could also be used, and the paper also implements versions with B-splines and orthogonal polynomials.
ISSN:0167-9473
DOI:10.1016/j.csda.2024.108036