Abstract
We present a probabilistic model where the latent variable respects both the distances and the topology of the modeled data. The model leverages the Riemannian geometry of the generated manifold to endow the latent space with a well-defined stochastic distance measure, which is modeled locally as Nakagami distributions. These stochastic distances are sought to be as similar as possible to observed distances along a neighborhood graph through a censoring process. The model is inferred by variational inference based on observations of pairwise distances. We demonstrate how the new model can encode invariances in the learned manifolds.
| Original language | English |
|---|---|
| Title of host publication | Proceedings of the 38th International Conference on Machine Learning |
| Number of pages | 10 |
| Volume | 139 |
| Publisher | International Machine Learning Society (IMLS) |
| Publication date | 2021 |
| Publication status | Published - 2021 |
| Event | 38th International Conference on Machine Learning - Virtual event Duration: 18 Jul 2021 → 24 Jul 2021 Conference number: 38 https://icml.cc/Conferences/2021 |
Conference
| Conference | 38th International Conference on Machine Learning |
|---|---|
| Number | 38 |
| Location | Virtual event |
| Period | 18/07/2021 → 24/07/2021 |
| Internet address |
| Series | Proceedings of Machine Learning Research |
|---|---|
| Volume | 139 |
| ISSN | 2640-3498 |