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BP: Fachverband Biologische Physik

BP 15: Computational Biophysics III

BP 15.8: Vortrag

Mittwoch, 11. März 2026, 11:45–12:00, BAR/SCHÖ

Gradient-Estimating Gillespie Simulators for Parameter Inference in Stochastic Models — •Ludwig Burger¹, Annalena Kofler², Lukas Heinrich³, and Ulrich Gerland¹ — ¹Physics of Complex Biosystems, School of Natural Sciences, Technical University Munich — ²Max Planck Institute for Intelligent Systems, Tübingen — ³Data Science in Physics, School of Natural Sciences, Technical University Munich

Stochastic models are ubiquitous in (biological) physics, yet fitting such parameterized models to experimental data remains challenging. While gradients in deterministic systems can be obtained efficiently through numerical or automatic differentiation, these tools cannot be directly applied to stochastic simulation algorithms such as the Gillespie algorithm, where sampling from a discrete set of reactions introduces non-differentiable operations. In this work, we adapt three gradient estimators from machine learning for use in Gillespie simulations: the Gumbel-Softmax Straight-Through estimator, the Score Function estimator, and the Alternative Path estimator. We extend all three estimators to address the specific requirements of gradient estimation in Gillespie simulations. We analyze the statistical properties of the estimators and highlight practical advantages and limitations in two representative systems: a minimal bimolecular association-dissociation model and the repressilator. Our results demonstrate that gradient estimators can be effectively integrated into the Gillespie algorithm, providing a systematic approach for gradient-based parameter inference in stochastic models.

Keywords: Stochastic Models; Gillespie Stochastic Simulation Algorithm; Gradient Estimation; Parameter Inference