Loss formulations for assumption-free neural inference of SDE coefficient functions.

Journal: NPJ systems biology and applications
PMID: 40025020

Abstract

Stochastic differential equations (SDEs) are one of the most commonly studied probabilistic dynamical systems, and widely used to model complex biological processes. Building upon the previously introduced idea of performing inference of dynamical systems by parametrising their coefficient functions via neural networks, we propose a novel formulation for an optimisation objective that combines simulation-based penalties with pseudo-likelihoods. This greatly improves prediction performance compared to the state-of-the-art, and makes it possible to learn a wide variety of dynamics without any prior assumptions on analytical structure.

Authors

  • Marc Vaisband
    Department of Internal Medicine III with Haematology, Medical Oncology, Haemostaseology, Infectiology and Rheumatology, Oncologic Center; Salzburg Cancer Research Institute - Laboratory for Immunological and Molecular Cancer Research (SCRI-LIMCR); Cancer Cluster Salzburg, Paracelsus Medical University, Salzburg, Austria. vaisband@uni-bonn.de.
  • Valentin von Bornhaupt
    Bonn Center for Mathematical Life Sciences, Life & Medical Sciences (LIMES) Institute, University of Bonn, Bonn, Germany.
  • Nina Schmid
    Bonn Center for Mathematical Life Sciences, Life & Medical Sciences (LIMES) Institute, University of Bonn, Bonn, Germany.
  • Izdar Abulizi
    Bonn Center for Mathematical Life Sciences, Life & Medical Sciences (LIMES) Institute, University of Bonn, Bonn, Germany.
  • Jan Hasenauer
    Helmholtz Zentrum München - German Research Center for Environmental Health, Institute of Computational Biology, 85764, Neuherberg, Germany. jan.hasenauer@uni-bonn.de.

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