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Functional Autoregression Without Truncation: A Continuous-Regularization Approach

Methodology 2026-04-29 v1

Abstract

Functional autoregressive models of order one (FAR(1)) are predominantly estimated by projecting curves onto leading functional principal components and fitting a vector autoregression in score space, requiring a discrete truncation level KK chosen by an \emph{ad hoc} variance threshold. We demonstrate via Monte Carlo experiments that the truncation choice is both consequential and highly regime dependent: the optimal KK can differ by an order of magnitude across data-generating regimes, while commonly used high variance thresholds (95\%, 99\%) lead to substantial forecast deterioration, inflating error by up to 35%35 \% relative to an oracle benchmark. We propose a Tikhonov-regularized estimator Ψ^α=C^1(C^0+αI)1\widehat{\Psi}_\alpha = \widehat{C}_1(\widehat{C}_0 + \alpha I)^{-1} that replaces the discrete truncation choice with a continuous regularization parameter, selected in a data-driven manner. We establish the convergence rate nβ/(2(β+1))n^{-\beta/(2(\beta+1))} under a source condition with smoothness parameter β(0,1]\beta \in (0, 1], achieving the saturation rate n1/4n^{-1/4} for smoother targets. Across three contrasting regimes and four sample sizes, the proposed estimator closely tracks the oracle-best FPCA rule and outperforms it in the most challenging wide-spectrum regime, without prior knowledge of the effective operator dimension. An application to 2{,}735 daily intraday PM10 curves from Vienna confirms a 9.7\% reduction in mean forecast error relative to the popular 80\% threshold and exhibits more stable parameter adaptation across 16 winter seasons.

Keywords

Cite

@article{arxiv.2604.25205,
  title  = {Functional Autoregression Without Truncation: A Continuous-Regularization Approach},
  author = {Yao Zhao},
  journal= {arXiv preprint arXiv:2604.25205},
  year   = {2026}
}

Comments

24 pages, 4 figures. Methodological paper on functional time series

R2 v1 2026-07-01T12:38:28.876Z