Abstract
This paper addresses differential inference in time-varying parametric probabilistic models, like graphical models with changing structures. Instead of estimating a high-dimensional model at each time and estimating changes later, we directly learn the differential parameter, i.e., the time derivative of the parameter. The main idea is treating the time score function of an exponential family model as a linear model of the differential parameter for direct estimation. We use time score matching to estimate parameter derivatives. We prove the consistency of a regularized score matching objective and demonstrate the finite-sample normality of a debiased estimator in high-dimensional settings. Our methodology effectively infers differential structures in high-dimensional graphical models, verified on simulated and real-world datasets. The code reproducing our experiments can be found at: \url{https://github.com/Leyangw/tsm}.
| Original language | English |
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| Title of host publication | Proceedings of The 28th International Conference on Artificial Intelligence and Statistics |
| Publisher | Proceedings of Machine Learning Research |
| Pages | 3493-3501 |
| Number of pages | 9 |
| Volume | 258 |
| Publication status | Published - 5 May 2025 |
| Event | The 28th International Conference on Artificial Intelligence and Statistics - Mai Khao, Thailand Duration: 3 May 2025 → 5 May 2025 https://aistats.org/aistats2025// |
Publication series
| Name | Proceedings of Machine Learning Research |
|---|---|
| Volume | 258 |
| ISSN (Electronic) | 2640-3498 |
Conference
| Conference | The 28th International Conference on Artificial Intelligence and Statistics |
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| Abbreviated title | AISTATS 2025 |
| Country/Territory | Thailand |
| City | Mai Khao |
| Period | 3/05/25 → 5/05/25 |
| Internet address |
Bibliographical note
Publisher Copyright:Copyright 2025 by the author(s).