Poster
in
Workshop: The Symbiosis of Deep Learning and Differential Equations II
Learning Ordinary Differential Equations with the Line Integral Loss Function
Albert Johannessen
A new training method for learning representations of dynamical systems with neural networks is derived using a loss function based on line integrals from vector calculus. The new training method is shown to learn the direction part of an ODE vector field with more accuracy and faster convergence compared to traditional methods. The learned direction can then be combined with another model that learns the magnitude explicitly to decouple the learning process of an ODE into two separate easier problems. It can also be used as a feature generator for time-series classification problems, performing well on motion classification of dynamical systems. The new method does however have multiple limitations that overall make the method less generalizable and only suited for some specific type of problems.