Interpretable polynomial neural ordinary differential equations
Colby Fronk, Linda Petzold
Abstract
Neural networks have the ability to serve as universal function approximators, but they are not interpretable and do not generalize well outside of their training region. Both of these issues are problematic when trying to apply standard neural ordinary differential equations (ODEs) to dynamical systems. We introduce the polynomial neural ODE, which is a deep polynomial neural network inside of the neural ODE framework. We demonstrate the capability of polynomial neural ODEs to predict outside of the training region, as well as to perform direct symbolic regression without using additional tools such as SINDy.
Topics & Concepts
OdeArtificial neural networkOrdinary differential equationPolynomialFunction (biology)Applied mathematicsComputer scienceMathematicsDifferential equationArtificial intelligenceMathematical analysisBiologyEvolutionary biologyModel Reduction and Neural NetworksNeural Networks and ApplicationsComputational Physics and Python Applications