English

Compositional amortized inference for large-scale hierarchical Bayesian models

Quantitative Methods 2026-04-08 v5

Abstract

Amortized Bayesian inference (ABI) with neural networks has emerged as a powerful simulation-based approach for estimating complex mechanistic models. However, extending ABI to hierarchical models, a cornerstone of modern Bayesian analysis, has been a major hurdle due to the need to simulate and process massive datasets. Our study tackles these challenges by extending compositional score matching (CSM), a divide-and-conquer strategy for Bayesian updating using diffusion models. We develop a new error-damping estimator to address previous stability issues of CSM when aggregating large numbers of data points. We first verified the numerical stability with up to 100,000 data points on a controlled benchmark. We then evaluated our method on a hierarchical AR model, achieving competitive performance to direct ABI baselines on smaller problem sizes while using less than one full model simulation for larger problem sizes. Finally, we address a large-scale inverse problem in advanced microscopy with over 750,000 parameters, demonstrating its relevance to real scientific applications.

Keywords

Cite

@article{arxiv.2505.14429,
  title  = {Compositional amortized inference for large-scale hierarchical Bayesian models},
  author = {Jonas Arruda and Vikas Pandey and Catherine Sherry and Margarida Barroso and Xavier Intes and Jan Hasenauer and Stefan T. Radev},
  journal= {arXiv preprint arXiv:2505.14429},
  year   = {2026}
}

Comments

Published as a conference paper at ICLR 2026

R2 v1 2026-07-01T02:25:17.426Z