Litcius/Paper detail

Toward a mathematical theory of trajectory inference

Hugo Lavenant, Stephen X. Zhang, Young‐Heon Kim, Geoffrey Schiebinger

2024The Annals of Applied Probability17 citationsDOI

Abstract

We devise a theoretical framework and a numerical method to infer trajectories of a stochastic process from samples of its temporal marginals. This problem arises in the analysis of single-cell RNA-sequencing data, which provide high-dimensional measurements of cell states but cannot track the trajectories of the cells over time. We prove that for a class of stochastic processes it is possible to recover the ground truth trajectories from limited samples of the temporal marginals at each time-point, and provide an efficient algorithm to do so in practice. The method we develop, Global Waddington-OT (gWOT), boils down to a smooth convex optimization problem posed globally over all time-points involving entropy-regularized optimal transport. We demonstrate that this problem can be solved efficiently in practice and yields good reconstructions, as we show on several synthetic and real data sets.

Topics & Concepts

MathematicsInferenceTrajectoryApplied mathematicsMathematical economicsCalculus (dental)Artificial intelligenceComputer scienceAstronomyMedicineDentistryPhysicsSingle-cell and spatial transcriptomicsGene Regulatory Network AnalysisStatistical Methods and Inference