Trajectory learning for ensemble forecasts via the continuous ranked probability score: a Lorenz '96 case study
Abstract
This paper demonstrates the feasibility of trajectory learning for ensemble forecasts by employing the continuous ranked probability score (CRPS) as a loss function. Using the two-scale Lorenz '96 system as a case study, we develop and train both additive and multiplicative stochastic parametrizations to generate ensemble predictions. Results indicate that CRPS-based trajectory learning produces parametrizations that are both accurate and sharp. The resulting parametrizations are straightforward to calibrate and outperform derivative-fitting-based parametrizations in short-term forecasts. This approach is particularly promising for data assimilation applications due to its accuracy over short lead times.
Cite
@article{arxiv.2508.21664,
title = {Trajectory learning for ensemble forecasts via the continuous ranked probability score: a Lorenz '96 case study},
author = {Sagy Ephrati and James Woodfield},
journal= {arXiv preprint arXiv:2508.21664},
year = {2025}
}
Comments
21 pages, 11 figures. All comments are welcome!