Bayesian Covariate-Dependent Gaussian Graphical Models with Varying Structure

Overview

Journal J Mach Learn Res

Publisher MIT Press

Date 2023 Oct 6

PMID 37799290

Authors

Yang Ni

Francesco C Stingo

Veerabhadran Baladandayuthapani

Affiliations

Soon will be listed here.

Abstract

We introduce Bayesian Gaussian graphical models with covariates (GGMx), a class of multivariate Gaussian distributions with covariate-dependent sparse precision matrix. We propose a general construction of a functional mapping from the covariate space to the cone of sparse positive definite matrices, which encompasses many existing graphical models for heterogeneous settings. Our methodology is based on a novel mixture prior for precision matrices with a non-local component that admits attractive theoretical and empirical properties. The flexible formulation of GGMx allows both the strength and the sparsity pattern of the precision matrix (hence the graph structure) change with the covariates. Posterior inference is carried out with a carefully designed Markov chain Monte Carlo algorithm, which ensures the positive definiteness of sparse precision matrices at any given covariates' values. Extensive simulations and a case study in cancer genomics demonstrate the utility of the proposed model.

References

Cai Q, Kang J, Yu T . Bayesian Network Marker Selection via the Thresholded Graph Laplacian Gaussian Prior. Bayesian Anal. 2020; 15(1):79-102. PMC: 7428197. DOI: 10.1214/18-ba1142. View

Greipp P, San Miguel J, Durie B, Crowley J, Barlogie B, Blade J . International staging system for multiple myeloma. J Clin Oncol. 2005; 23(15):3412-20. DOI: 10.1200/JCO.2005.04.242. View

Friedman J, Hastie T, Tibshirani R . Sparse inverse covariance estimation with the graphical lasso. Biostatistics. 2007; 9(3):432-41. PMC: 3019769. DOI: 10.1093/biostatistics/kxm045. View

Herve A, Florence M, Philippe M, Michel A, Thierry F, Kenneth A . Molecular heterogeneity of multiple myeloma: pathogenesis, prognosis, and therapeutic implications. J Clin Oncol. 2011; 29(14):1893-7. DOI: 10.1200/JCO.2010.32.8435. View

Xie Y, Liu Y, Valdar W . Joint Estimation of Multiple Dependent Gaussian Graphical Models with Applications to Mouse Genomics. Biometrika. 2017; 103(3):493-511. PMC: 5640885. DOI: 10.1093/biomet/asw035. View

Lohr J, Stojanov P, Carter S, Cruz-Gordillo P, Lawrence M, Auclair D . Widespread genetic heterogeneity in multiple myeloma: implications for targeted therapy. Cancer Cell. 2014; 25(1):91-101. PMC: 4241387. DOI: 10.1016/j.ccr.2013.12.015. View

Rothman A, Levina E, Zhu J . Sparse Multivariate Regression With Covariance Estimation. J Comput Graph Stat. 2014; 19(4):947-962. PMC: 4065863. DOI: 10.1198/jcgs.2010.09188. View

Chapman M, Lawrence M, Keats J, Cibulskis K, Sougnez C, Schinzel A . Initial genome sequencing and analysis of multiple myeloma. Nature. 2011; 471(7339):467-72. PMC: 3560292. DOI: 10.1038/nature09837. View

Rossell D, Telesca D . NON-LOCAL PRIORS FOR HIGH-DIMENSIONAL ESTIMATION. J Am Stat Assoc. 2018; 112(517):254-265. PMC: 5988374. DOI: 10.1080/01621459.2015.1130634. View

10.

Bhadra A, Mallick B . Joint high-dimensional Bayesian variable and covariance selection with an application to eQTL analysis. Biometrics. 2013; 69(2):447-57. DOI: 10.1111/biom.12021. View

11.

Liu T, Zhang L, Joo D, Sun S . NF-κB signaling in inflammation. Signal Transduct Target Ther. 2017; 2. PMC: 5661633. DOI: 10.1038/sigtrans.2017.23. View

12.

Guo J, Levina E, Michailidis G, Zhu J . Joint estimation of multiple graphical models. Biometrika. 2012; 98(1):1-15. PMC: 3412604. DOI: 10.1093/biomet/asq060. View

13.

Cheng J, Levina E, Wang P, Zhu J . A sparse Ising model with covariates. Biometrics. 2014; 70(4):943-53. PMC: 4425428. DOI: 10.1111/biom.12202. View

14.

Johnson V, Rossell D . Bayesian Model Selection in High-Dimensional Settings. J Am Stat Assoc. 2013; 107(498). PMC: 3867525. DOI: 10.1080/01621459.2012.682536. View

15.

Roy P, Sarkar U, Basak S . The NF-κB Activating Pathways in Multiple Myeloma. Biomedicines. 2018; 6(2). PMC: 6027071. DOI: 10.3390/biomedicines6020059. View

16.

Danaher P, Wang P, Witten D . The joint graphical lasso for inverse covariance estimation across multiple classes. J R Stat Soc Series B Stat Methodol. 2014; 76(2):373-397. PMC: 4012833. DOI: 10.1111/rssb.12033. View

17.

Yajima M, Telesca D, Ji Y, Muller P . Detecting differential patterns of interaction in molecular pathways. Biostatistics. 2014; 16(2):240-51. PMC: 4441103. DOI: 10.1093/biostatistics/kxu054. View

18.

Demchenko Y, Glebov O, Zingone A, Keats J, Bergsagel P, Kuehl W . Classical and/or alternative NF-kappaB pathway activation in multiple myeloma. Blood. 2010; 115(17):3541-52. PMC: 2867265. DOI: 10.1182/blood-2009-09-243535. View

19.

Shin M, Bhattacharya A, Johnson V . Scalable Bayesian Variable Selection Using Nonlocal Prior Densities in Ultrahigh-dimensional Settings. Stat Sin. 2018; 28(2):1053-1078. PMC: 5891168. DOI: 10.5705/ss.202016.0167. View

20.

Yin J, Li H . A SPARSE CONDITIONAL GAUSSIAN GRAPHICAL MODEL FOR ANALYSIS OF GENETICAL GENOMICS DATA. Ann Appl Stat. 2012; 5(4):2630-2650. PMC: 3419502. DOI: 10.1214/11-AOAS494. View