English

Gradient-based filtering under misspecification: Stability and error bounds

Methodology 2026-05-05 v8 Signal Processing Machine Learning

Abstract

Can stochastic gradient methods track a moving target? We study the problem of tracking multidimensional time-varying parameters under noisy observations and possible model misspecification. Gradient-based filters update the time-varying parameters using the gradient of a postulated objective function. A natural filtering objective is the logarithm of the postulated observation density, which gives rise to the widely used class of score-driven filters. As in the optimization literature, these filters come in two forms: explicit filters evaluate the gradient at the predicted parameter, whereas implicit filters evaluate it at the updated parameter. For both filter types, we derive novel sufficient conditions for exponential stability of the filtered parameter path, showing that stability can be guaranteed independently of the data-generating process. Under mild additional moment conditions on the data-generating process, we also obtain finite-sample and asymptotic mean squared error bounds relative to the pseudo-true parameter path. For implicit filters, these guarantees hold under weak parameter restrictions. For explicit filters, they additionally require Lipschitz continuity of the score and a sufficiently small learning rate. Simulation studies support our theoretical findings and show that implicit gradient filters outperform explicit ones in both accuracy and stability.

Keywords

Cite

@article{arxiv.2502.05021,
  title  = {Gradient-based filtering under misspecification: Stability and error bounds},
  author = {Simon Donker van Heel and Rutger-Jan Lange and Bram van Os and Dick van Dijk},
  journal= {arXiv preprint arXiv:2502.05021},
  year   = {2026}
}

Comments

64 pages

R2 v1 2026-06-28T21:36:16.419Z