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Main Authors: Huang, Kun, Peng, Xiyu, Sang, Huiyan, Lu, Ligang
Format: Preprint
Published: 2026
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Online Access:https://arxiv.org/abs/2605.30658
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author Huang, Kun
Peng, Xiyu
Sang, Huiyan
Lu, Ligang
author_facet Huang, Kun
Peng, Xiyu
Sang, Huiyan
Lu, Ligang
contents Motivated by a high-dimensional regression problem in spatial multimodal omics (SMO), we propose a Bayesian framework for local spatial feature selection, where a random domain partition prior is introduced to divide the spatial domain into several contiguous clusters with flexible shapes and an unknown number of clusters, conditional on which a local feature selection prior is imposed within each cluster. The notion of "feature" is general and may include both covariates and functional bases, allowing the framework to perform both local variable selection and local basis selection, the latter being essential for adaptively approximating spatially varying functions with localized characteristics. We derive coupled hyperparameter conditions linking domain partition and local feature selection priors, under which the consistency theory and posterior contraction rates of both the domain partition and feature selection are established. We develop an efficient informed reversible jump Markov chain Monte Carlo algorithm to address the computational challenges encountered in joint posterior sampling of domain partitions and selected features. Simulation studies demonstrate the effectiveness of the proposed model and algorithm, highlighting its advantages over existing methods. The application of our model to an SMO dataset reveals biologically meaningful spatial patterns within breast cancer tissue.
format Preprint
id arxiv_https___arxiv_org_abs_2605_30658
institution arXiv
publishDate 2026
record_format arxiv
spellingShingle Consistent Bayesian Local Spatial Feature Selection with Application to Spatial Multimodal Omics
Huang, Kun
Peng, Xiyu
Sang, Huiyan
Lu, Ligang
Methodology
Motivated by a high-dimensional regression problem in spatial multimodal omics (SMO), we propose a Bayesian framework for local spatial feature selection, where a random domain partition prior is introduced to divide the spatial domain into several contiguous clusters with flexible shapes and an unknown number of clusters, conditional on which a local feature selection prior is imposed within each cluster. The notion of "feature" is general and may include both covariates and functional bases, allowing the framework to perform both local variable selection and local basis selection, the latter being essential for adaptively approximating spatially varying functions with localized characteristics. We derive coupled hyperparameter conditions linking domain partition and local feature selection priors, under which the consistency theory and posterior contraction rates of both the domain partition and feature selection are established. We develop an efficient informed reversible jump Markov chain Monte Carlo algorithm to address the computational challenges encountered in joint posterior sampling of domain partitions and selected features. Simulation studies demonstrate the effectiveness of the proposed model and algorithm, highlighting its advantages over existing methods. The application of our model to an SMO dataset reveals biologically meaningful spatial patterns within breast cancer tissue.
title Consistent Bayesian Local Spatial Feature Selection with Application to Spatial Multimodal Omics
topic Methodology
url https://arxiv.org/abs/2605.30658