Leray-Schauder Mappings for Operator Learning
About
We present an algorithm for learning operators between Banach spaces, based on the use of Leray-Schauder mappings to learn a finite-dimensional approximation of compact subspaces. We show that the resulting method is a universal approximator of (possibly nonlinear) operators. We demonstrate the efficiency of the approach on two benchmark datasets showing it achieves results comparable to state of the art models.
Emanuele Zappala• 2024
Related benchmarks
| Task | Dataset | Result | Rank | |
|---|---|---|---|---|
| Operator learning | viscous Burgers' equation n=512 | Relative Error0.0017 | 12 | |
| Operator learning | IE Spirals Full grid (Original) | Error0.0011 | 5 | |
| Operator learning | IE Spirals Interpolation Downsampled (train) | Error0.0011 | 5 | |
| Operator learning | Burgers' Grid size 256 | Error0.0017 | 2 |
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