Sylvester Normalizing Flows for Variational Inference
About
Variational inference relies on flexible approximate posterior distributions. Normalizing flows provide a general recipe to construct flexible variational posteriors. We introduce Sylvester normalizing flows, which can be seen as a generalization of planar flows. Sylvester normalizing flows remove the well-known single-unit bottleneck from planar flows, making a single transformation much more flexible. We compare the performance of Sylvester normalizing flows against planar flows and inverse autoregressive flows and demonstrate that they compare favorably on several datasets.
Rianne van den Berg, Leonard Hasenclever, Jakub M. Tomczak, Max Welling• 2018
Related benchmarks
| Task | Dataset | Result | Rank | |
|---|---|---|---|---|
| Variational Inference | Omniglot (test) | -- | 30 | |
| Variational Inference | MNIST (test) | Negative ELBO83.32 | 10 | |
| Variational Inference | MNIST statically binarized | Negative ELBO83.32 | 5 | |
| Variational Inference | Omniglot | Neg ELBO99 | 5 | |
| Variational Inference | Caltech 101 Silhouettes | Negative ELBO104.6 | 5 | |
| Variational Inference | Caltech Silhouettes (test) | Negative ELBO (nats)104.6 | 5 | |
| Variational Inference | Frey Faces (test) | Negative ELBO (bits/dim)4.45 | 5 | |
| Variational Inference | Freyfaces | Negative ELBO4.45 | 5 |
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