Averaging Spatio-temporal Signals using Optimal Transport and Soft Alignments
This addresses the challenge of analyzing complex evolving datasets in fields like genomics and neuroimaging, though it is incremental as it builds on existing methods like DTW and OT.
The authors tackled the problem of averaging spatio-temporal signals with invariance to time, space, and population size, proposing a framework that synthesizes representative template trajectories, and demonstrated its effectiveness on handwritten letters and brain imaging data with efficient computation.
Several fields in science, from genomics to neuroimaging, require monitoring populations (measures) that evolve with time. These complex datasets, describing dynamics with both time and spatial components, pose new challenges for data analysis. We propose in this work a new framework to carry out averaging of these datasets, with the goal of synthesizing a representative template trajectory from multiple trajectories. We show that this requires addressing three sources of invariance: shifts in time, space, and total population size (or mass/amplitude). Here we draw inspiration from dynamic time warping (DTW), optimal transport (OT) theory and its unbalanced extension (UOT) to propose a criterion that can address all three issues. This proposal leverages a smooth formulation of DTW (Soft-DTW) that is shown to capture temporal shifts, and UOT to handle both variations in space and size. Our proposed loss can be used to define spatio-temporal barycenters as Fréchet means. Using Fenchel duality, we show how these barycenters can be computed efficiently, in parallel, via a novel variant of entropy-regularized debiased UOT. Experiments on handwritten letters and brain imaging data confirm our theoretical findings and illustrate the effectiveness of the proposed loss for spatio-temporal data.