Beyond Shrinkage: Foundations of Data-Driven Control for Piecewise Affine Systems

Gianluca Giacomelli; Matthias A. M\"uller; Simone Formentin; Valentina Breschi; Victor G. Lopez

arxiv: 2605.23524 · v1 · pith:TK2MUC2Knew · submitted 2026-05-22 · 📡 eess.SY · cs.SY

Beyond Shrinkage: Foundations of Data-Driven Control for Piecewise Affine Systems

Gianluca Giacomelli , Victor G. Lopez , Simone Formentin , Matthias A. M\"uller , Valentina Breschi This is my paper

Pith reviewed 2026-05-25 03:47 UTC · model grok-4.3

classification 📡 eess.SY cs.SY

keywords data-enabled predictive controlpiecewise affine systemsWillems fundamental lemmabehavioral controlDeePCshrinkage regularizationmisclassification errorshybrid systems

0 comments

The pith

Piecewise affine systems need an extended behavioral lemma for data-driven control, as linear predictors with shrinkage fall short.

A machine-rendered reading of the paper's core claim, the machinery that carries it, and where it could break.

This paper lays the foundations for data-enabled predictive control of piecewise affine systems by first characterizing their behavior and then extending Willems' Fundamental Lemma to represent trajectories directly from raw data. It shows through analysis that DeePC strategies built on linear predictors and shrinkage regularizers produce predictions that are incoherent with the piecewise structure. The work further examines how errors in classifying the different affine regions affect the organization of data for prediction. A sympathetic reader would care because PWA systems are widely used to approximate nonlinear and hybrid dynamics, yet existing data-driven methods have not been adapted to them, limiting explainability and effectiveness in practice.

Core claim

The authors provide a behavioral characterization of piecewise affine systems and extend Willems' Fundamental Lemma to represent their input-output behavior from raw data. They demonstrate that DeePC approaches using a linear predictor together with shrinkage regularizers lack coherence with PWA dynamics. They also analyze the impact of misclassification errors when structuring data for prediction, concluding that effective and explainable control requires moving beyond regularized linear DeePC to methods that respect the piecewise affine nature of the system.

What carries the argument

The extension of Willems' Fundamental Lemma to piecewise affine systems, which represents their behavior from raw input-output data without explicit model identification.

If this is right

Piecewise affine systems admit a behavioral characterization that supports data-driven methods.
An extended Willems' Fundamental Lemma enables representation of PWA behavior directly from raw data.
DeePC strategies based on linear predictors and shrinkage regularizers are incoherent with PWA system behavior.
Misclassification errors in identifying affine regions affect data structuring and subsequent prediction quality.
Control actions for PWA systems must incorporate PWA-specific structure to remain effective and explainable.

Where Pith is reading between the lines

These are editorial extensions of the paper, not claims the author makes directly.

The coherence results suggest that data-driven predictors for hybrid systems will generally need to incorporate mode information rather than relying on a single linear model.
The misclassification analysis indicates potential sensitivity of data-driven PWA control to uncertainties in region identification.
Similar behavioral extensions could be pursued for other classes of switched or hybrid systems that admit piecewise descriptions.
The simple numerical validation leaves open whether the proposed foundations scale to higher-dimensional or more complex PWA examples.

Load-bearing premise

The coherence analysis of linear predictors with shrinkage and the misclassification study, supported by a simple numerical example, suffice to establish the need to extend beyond regularized linear DeePC for PWA systems.

What would settle it

A concrete case where a linear predictor with shrinkage regularization generates predictions that exactly match all possible PWA trajectories from the data, or raw data for which the extended lemma fails to capture the observed PWA behavior.

read the original abstract

Data-enabled predictive control (DeePC) has recently attracted attention as a promising approach for controlling systems directly from raw data, without requiring an explicit identification step. However, DeePC has not yet been extended to piecewise affine (PWA) systems, despite their extensive use in the (predictive) control literature and their universal approximation capabilities. To address this gap, in this work, we lay the foundations for data-enabled predictive control of PWA systems, providing: $(i)$ their behavioral characterization; $(ii)$ an extension of Willems' Fundamental Lemma to represent their behavior from raw data; $(iii)$ an analysis of the coherence of DeePC strategies using a linear predictor and shrinkage regularizers; and $(iv)$ a study of the impact of misclassification errors on structuring data for prediction. Our theoretical findings are validated by numerical results on a simple example, emphasizing the need to extend beyond a regularized version of the foundational DeePC framework to design control actions that are both effective and coherent with a PWA system's behavior, thus ensuring the controller's explainability.

Editorial analysis

A structured set of objections, weighed in public.

Desk editor's note, referee report, simulated authors' rebuttal, and a circularity audit. Tearing a paper down is the easy half of reading it; the pith above is the substance, this is the friction.

Desk Editor's Note private letter to a colleague

This paper gives the first behavioral characterization and Fundamental Lemma extension for DeePC on PWA systems, but the single-example validation does not clearly show why shrinkage on linear predictors must be abandoned.

read the letter

The main advance is the extension of the behavioral framework to piecewise affine systems. They characterize the behavior, extend Willems' lemma to represent it from raw data, analyze coherence of linear DeePC with shrinkage, and examine how misclassification affects data structuring. These pieces address a real gap since PWA models are common in control but had not been handled in the DeePC setting before. The theoretical steps look carefully done and connect back to existing shrinkage work without obvious contradictions. The coherence and misclassification sections are useful for thinking about when a linear predictor stays consistent with the underlying switched dynamics. The numerical part is the soft spot. It uses only one simple example, which does not demonstrate PWA-specific failures like mode-dependent rank loss or switching-induced prediction errors that shrinkage cannot handle. A single low-dimensional case leaves open whether the observed issues are general or tied to the chosen regions. More examples with different switching patterns and direct comparisons of prediction error or closed-loop cost would make the case for moving beyond shrinkage stronger. The paper is aimed at people already working in behavioral and data-driven control who also deal with hybrid or PWA models. Readers who know DeePC well will see the value in the new lemma and characterization. It deserves peer review because the core theoretical contributions are new and the gap is legitimate, even if the empirical support needs more cases to carry the full claim. I would send it to referees with a request to expand the numerical validation.

Referee Report

2 major / 1 minor

Summary. The paper lays foundations for data-enabled predictive control (DeePC) of piecewise affine (PWA) systems. It provides (i) a behavioral characterization of PWA systems, (ii) an extension of Willems' Fundamental Lemma to represent PWA behavior from raw data, (iii) an analysis of coherence for DeePC strategies that employ linear predictors and shrinkage regularizers, and (iv) a study of misclassification errors when structuring data for prediction. Theoretical findings are validated on a single simple numerical example, which is used to argue that regularized linear DeePC must be extended to achieve control actions coherent with PWA dynamics.

Significance. If the behavioral characterization and Fundamental Lemma extension are rigorously derived, and if the coherence analysis demonstrates quantifiable limitations of linear shrinkage for PWA switching, the work would provide a useful starting point for data-driven control of a practically relevant system class. The explicit treatment of misclassification effects on data matrices is a constructive contribution. However, the single-example validation does not yet establish generality of the 'beyond shrinkage' conclusion.

major comments (2)

[§7] §7 (Numerical Example): The validation consists of one low-dimensional PWA system. To support the central claim that linear DeePC with shrinkage must be extended, the example must exhibit PWA-specific phenomena (mode-dependent trajectories or switching-induced rank deficiencies) where linear shrinkage produces measurably incoherent predictions or higher closed-loop cost, with explicit quantitative comparison to a PWA-aware predictor. A single case leaves open whether the observed incoherence is general or an artifact of the chosen regions.
[§5] §5 (Coherence Analysis): The analysis of linear-predictor coherence under shrinkage must include a concrete metric (e.g., prediction error norm or data-matrix rank drop across modes) showing that shrinkage cannot restore coherence for PWA trajectories; without this, the necessity of moving 'beyond shrinkage' rests on an extrapolation rather than a demonstrated insufficiency.

minor comments (1)

[Abstract] Abstract: The phrase 'simple numerical example' should be accompanied by the system order and number of affine regions to allow readers to assess the scope of the validation immediately.

Simulated Author's Rebuttal

2 responses · 0 unresolved

We thank the referee for the constructive and detailed comments. We address each major comment point by point below, indicating the revisions we will incorporate to strengthen the manuscript.

read point-by-point responses

Referee: [§7] §7 (Numerical Example): The validation consists of one low-dimensional PWA system. To support the central claim that linear DeePC with shrinkage must be extended, the example must exhibit PWA-specific phenomena (mode-dependent trajectories or switching-induced rank deficiencies) where linear shrinkage produces measurably incoherent predictions or higher closed-loop cost, with explicit quantitative comparison to a PWA-aware predictor. A single case leaves open whether the observed incoherence is general or an artifact of the chosen regions.

Authors: We agree that reliance on a single low-dimensional example limits the strength of the central claim. In the revised version we will augment §7 with explicit quantitative comparisons (prediction error norms and closed-loop costs) between the linear shrinkage DeePC and a PWA-aware predictor, while explicitly highlighting mode-dependent trajectories and switching-induced rank deficiencies in the data matrices. These additions will demonstrate that the observed incoherence arises from the linear predictor’s inability to capture PWA switching rather than from the specific choice of regions. revision: yes
Referee: [§5] §5 (Coherence Analysis): The analysis of linear-predictor coherence under shrinkage must include a concrete metric (e.g., prediction error norm or data-matrix rank drop across modes) showing that shrinkage cannot restore coherence for PWA trajectories; without this, the necessity of moving 'beyond shrinkage' rests on an extrapolation rather than a demonstrated insufficiency.

Authors: We will revise §5 to include the requested concrete metrics—specifically the prediction error norm and the rank drop of the data matrix across modes—thereby showing quantitatively that shrinkage regularizers cannot restore coherence when trajectories cross PWA switching surfaces. This will replace the current extrapolation with a direct demonstration of insufficiency. revision: yes

Circularity Check

0 steps flagged

No circularity: claims rest on independent theoretical extensions and external validation

full rationale

The abstract and provided text outline four distinct contributions—behavioral characterization of PWA systems, an extension of Willems' Fundamental Lemma, coherence analysis of linear predictors with shrinkage, and misclassification impact—without any quoted equations, self-citations, or fitted parameters that reduce a 'prediction' or result to the inputs by construction. The numerical example is presented as validation rather than a fitted input renamed as output. No self-definitional loops, ansatzes smuggled via citation, or uniqueness theorems imported from the authors' prior work appear in the load-bearing steps. This is the normal self-contained case; the derivation chain does not collapse to its own definitions or data fits.

Axiom & Free-Parameter Ledger

0 free parameters · 0 axioms · 0 invented entities

Insufficient detail in abstract to identify free parameters, axioms, or invented entities; no equations or modeling choices are shown.

pith-pipeline@v0.9.0 · 5734 in / 1085 out tokens · 21971 ms · 2026-05-25T03:47:31.530628+00:00 · methodology

discussion (0)

Reference graph

Works this paper leans on

55 extracted references · 45 canonical work pages · 1 internal anchor

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