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Scalable Gradients for Stochastic Differential Equations

Xuechen Li, Ting‐Kam Leonard Wong, Ricky T. Q. Chen, David Duvenaud

2020International Conference on Artificial Intelligence and Statistics37 citations

Abstract

The adjoint sensitivity method scalably computes gradients of solutions to ordinary differential equations. We generalize this method to stochastic differential equations, allowing time-efficient and constant-memory computation of gradients with high-order adaptive solvers. Specifically, we derive a stochastic differential equation whose solution is the gradient, a memory-efficient algorithm for caching noise, and conditions under which numerical solutions converge. In addition, we combine our method with gradient-based stochastic variational inference for latent stochastic differential equations. We use our method to fit stochastic dynamics defined by neural networks, achieving competitive performance on a 50-dimensional motion capture dataset.

Topics & Concepts

Stochastic differential equationStochastic partial differential equationComputer scienceApplied mathematicsOrdinary differential equationDifferential equationMathematicsScalabilitySensitivity (control systems)Mathematical optimizationMathematical analysisDatabaseElectronic engineeringEngineeringModel Reduction and Neural NetworksGenerative Adversarial Networks and Image SynthesisStochastic Gradient Optimization Techniques
Scalable Gradients for Stochastic Differential Equations | Litcius