English

Deep-layer limit and stability analysis of the basic forward-backward-splitting induced network (II): learning problems

Machine Learning 2026-05-27 v1 Artificial Intelligence

Abstract

Deep unfolding neural networks derived from iterative optimization schemes and numerical ordinary/partial differential equations (ODEs/PDEs) have attracted much attention in data science over the last decade. Therein, numerous important network architectures were constructed from the basic forward-backward-splitting (FBS) algorithm. In this paper, we continue our research on the most basic FBS-induced network, an architecture unrolled from the original FBS algorithm by incorporating direct parameter relaxations. Following the difference/differential inclusion formulations in our previous forward system analyses, we here consider some theoretical aspects of corresponding learning problems. Under some mild assumptions, we establish a general convergence property of the training problem of the basic FBS-induced network to the learning problem of the deep-layer limit system, implying a Γ\Gamma-convergence argument showing that any cluster point of the optimal learning parameters for the network is a solution to the learning problem of the deep-layer limit system. A qualitative analysis of perturbation stabilities of these learning problems is also presented. A simple numerical experiment is conducted to validate our main general convergence result.

Keywords

Cite

@article{arxiv.2605.27133,
  title  = {Deep-layer limit and stability analysis of the basic forward-backward-splitting induced network (II): learning problems},
  author = {Xuan Lin and Chunlin Wu},
  journal= {arXiv preprint arXiv:2605.27133},
  year   = {2026}
}

Comments

38 pages, 1 figure