Kalman-Wasserstein Gradient Flows

[Moved Online] Hot Topics: Optimal transport and applications to machine learning and statistics May 04, 2020 - May 08, 2020

May 05, 2020 (09:30 AM PDT - 10:30 AM PDT)

Speaker(s): Franca Hoffman (California Institute of Technology)
Location: SLMath: Online/Virtual

Tags/Keywords

Ensemble Kalman Inversion
Kalman-Wasserstein metric
Gradient Flow
Mean-Field Fokker-Planck equation

Primary Mathematics Subject Classification

76E15 - Absolute and convective instability and stability in hydrodynamic stability

Secondary Mathematics Subject Classification

58C30 - Fixed-point theorems on manifolds [See also 47H10]

Video

Kalman-Wasserstein Gradient Flows

Abstract

We study a class of interacting particle systems that may be used for optimization. By considering the mean-field limit one obtains a nonlinear Fokker-Planck equation. This equation exhibits a gradient structure in probability space, based on a modified Wasserstein distance which reflects particle correlations: the Kalman-Wasserstein metric. This setting gives rise to a methodology for calibrating and quantifying uncertainty for parameters appearing in complex computer models which are expensive to run, and cannot readily be differentiated. This is achieved by connecting the interacting particle system to ensemble Kalman methods for inverse problems. This is joint work with Alfredo Garbuno-Inigo (Caltech), Wuchen Li (UCLA) and Andrew Stuart (Caltech).

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Kalman-Wasserstein Gradient Flows

H.264 Video	928_28384_8321_Kalman_Wasserstein_Gradient_Flows.mp4	Download 1080p (3.82 GB) 720p (2.94 GB) 360p (752 MB)

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