Estimatable variation neural networks and their application to scalar hyperbolic conservation laws
Abstract
We introduce estimatable variation neural networks (EVNNs), a class of neural networks that allow a computationally cheap estimate on the BV norm motivated by the space BMV of functions with bounded M-variation. We prove a universal approximation theorem for EVNNs and discuss possible implementations. We construct sequences of loss functionals for ODEs and scalar hyperbolic conservation laws for which a vanishing loss leads to convergence. Moreover, we show the existence of sequences of loss minimizing neural networks if the solution is an element of BMV. Several numerical test cases illustrate that it is possible to use standard techniques to minimize these loss functionals for EVNNs.
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