No-Harm Physics-Informed Inverse Learning with Residual-Calibrated Uncertainty

Ronald Katende

arxiv: 2606.07153 · v1 · pith:23TOQHPKnew · submitted 2026-06-05 · 🧮 math.NA · cs.LG· cs.NA· math.OC

No-Harm Physics-Informed Inverse Learning with Residual-Calibrated Uncertainty

Ronald Katende This is my paper

Pith reviewed 2026-06-27 21:21 UTC · model grok-4.3

classification 🧮 math.NA cs.LGcs.NAmath.OC

keywords physics-informed inverse problemsresidual calibrationuncertainty quantificationcertification frameworkconditional stability estimatePDE inverse problemsno-harm selection

0 comments

The pith

A learned PDE inverse solution is kept only if its residual-calibrated uncertainty radius is no larger than the baseline radius plus a safety margin.

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

The paper develops a certification-and-selection layer for physics-informed methods that solve inverse problems for partial differential equations. It forms a deterministic uncertainty radius from the combined data, physics, boundary or initial-condition, and optimization residuals, then accepts the learned reconstruction only when this radius satisfies R_learn ≤ R_base + ε_safe; otherwise it returns the baseline method. The conversion of residuals into an error bound rests on a conditional stability estimate. A high-probability version of the certificate is also given when the physics residual is estimated from independent random collocation points. Numerical experiments on source recovery, heat reconstruction, tomography, coefficient identification, and stochastic validation show the selector accepts certified gains while rejecting unreliable outputs.

Core claim

Under a conditional stability estimate the sum of data, physics, boundary/initial-condition and optimization residuals produces an a posteriori reconstruction-error bound and a deterministic uncertainty radius; a learned reconstruction is therefore accepted only when R_learn ≤ R_base + ε_safe and is otherwise replaced by the baseline.

What carries the argument

The residual-calibrated uncertainty radius obtained by combining data, physics, boundary/initial-condition and optimization residuals under a conditional stability estimate, which supplies both the a posteriori error bound and the no-harm acceptance test.

If this is right

The selector returns the baseline whenever a learned candidate is shifted, hallucinated or unfinished.
The method grows conservative as the underlying inverse problem becomes more strongly ill-posed.
High-probability certificates continue to hold when physics residuals are computed from independent random collocation points.
The framework functions as an add-on certification layer rather than a new reconstruction architecture.

Where Pith is reading between the lines

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

The same residual-to-radius conversion could be tested on forward problems or non-PDE inverse tasks whenever an analogous stability relation can be stated.
The acceptance test supplies an automatic rejection signal that could be used to compare or prune different network architectures during training.

Load-bearing premise

A conditional stability estimate exists that turns the sum of the residuals into a bound on the reconstruction error.

What would settle it

A concrete inverse problem in which the combined residuals remain below a chosen threshold yet the true reconstruction error exceeds the radius predicted by the stability estimate.

Figures

Figures reproduced from arXiv: 2606.07153 by Ronald Katende.

**Figure 2.** Figure 2: Acceptance-rate heatmap for the representative [PITH_FULL_IMAGE:figures/full_fig_p019_2.png] view at source ↗

**Figure 5.** Figure 5: Median certificate ratio Rlearn/Rbase over observation count and noise level for σlearn = 0.05 and µ = 0.02. Values above one lie outside the certificatesufficient region. The figure shows that increased observation density can reduce the ratio, but physics inconsistency can still keep the learned reconstruction outside the no-harm acceptance region. The sufficiency sweep answers the threshold question… view at source ↗

**Figure 6.** Figure 6: Representative PDE-based reconstructions for the Poisson and inverse heat experiments. The left panel shows [PITH_FULL_IMAGE:figures/full_fig_p020_6.png] view at source ↗

**Figure 7.** Figure 7: Coefficient-recovery and residual-field diagnostics. The left panel shows the geophysical-style elliptic [PITH_FULL_IMAGE:figures/full_fig_p020_7.png] view at source ↗

**Figure 8.** Figure 8: Limited-angle tomography reconstruction comparison. The figure compares the baseline, learned, and [PITH_FULL_IMAGE:figures/full_fig_p021_8.png] view at source ↗

**Figure 9.** Figure 9: Three-dimensional tomography surface comparison. The figure compares the true reconstruction target with [PITH_FULL_IMAGE:figures/full_fig_p021_9.png] view at source ↗

**Figure 10.** Figure 10: Problem-specific certificate diagnostics. The left panel compares the true reconstruction error with the [PITH_FULL_IMAGE:figures/full_fig_p022_10.png] view at source ↗

**Figure 11.** Figure 11: Residual-sampling and aggregate calibration diagnostics. The left panel shows the stochastic residual [PITH_FULL_IMAGE:figures/full_fig_p022_11.png] view at source ↗

**Figure 12.** Figure 12: Aggregate decision diagnostics. The left panel reports empirical coverage of the certified uncertainty sets by [PITH_FULL_IMAGE:figures/full_fig_p023_12.png] view at source ↗

read the original abstract

Physics-informed learning is increasingly used for partial differential equation (PDE)-governed inverse problems, but its reliability remains difficult to certify. This paper develops a no-harm certification-and-selection framework for physics-informed inverse learning. A learned reconstruction is accepted only when its residual-calibrated radius is no worse than the baseline radius, namely when $$R_{\mathrm{learn}}\le R_{\mathrm{base}}+\varepsilon_{\mathrm{safe}};$$otherwise, the method returns the baseline. The certificate combines data, physics, boundary or initial-condition, and optimization residuals. Under a conditional stability estimate, these residuals yield an a posteriori reconstruction-error bound and a deterministic uncertainty radius. A high-probability certificate is also derived for physics residuals estimated from independent random collocation points. Numerical tests on Poisson source recovery, inverse heat reconstruction, limited-angle tomography, elliptic coefficient identification, and stochastic residual validation show that the selector accepts certified improvements, rejects shifted, hallucinated, or unfinished candidates, and becomes conservative in strongly ill-posed regimes. The framework is therefore a certification-and-selection layer, not another reconstruction architecture.

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

The paper gives a residual-aggregation selector that accepts a learned inverse solution only when its calibrated radius beats the baseline, but the whole thing rests on an unverified conditional stability estimate.

read the letter

The main contribution is a post-processing selector for physics-informed inverse solvers. It computes a combined residual from data, physics, boundary/initial conditions, and optimization, turns that into a deterministic uncertainty radius under a conditional stability assumption, and accepts the learned reconstruction only if that radius is no worse than the baseline plus a safety margin. A high-probability version is given for random collocation points. The numerical tests on Poisson source recovery, inverse heat, limited-angle tomography, and elliptic coefficient identification show the rule rejecting shifted or unfinished candidates and staying conservative in ill-posed regimes.

This is a practical layer rather than a new solver architecture, and the experiments give concrete evidence that the selector behaves as described on those problems. The deterministic-plus-probabilistic certificate combination looks new relative to the cited prior work.

The load-bearing step is the conditional stability estimate that converts the residual sum into a reconstruction-error bound. The abstract invokes it but supplies no derivation, no explicit constants, and no numerical check that the estimate holds with usable tightness on the test problems. Without that piece, the claimed a-posteriori bounds and the no-harm guarantee do not follow from the residuals. The stress-test note is on target here.

The work is aimed at people already running physics-informed methods on inverse PDE problems and wanting a simple acceptance check. A reader focused on reliability questions would find the selector rule and the rejection behavior useful to examine. It is coherent enough on its own terms to merit a serious referee, mainly so the stability assumption can be pressed in review.

Referee Report

2 major / 1 minor

Summary. The paper presents a no-harm certification-and-selection framework for physics-informed inverse learning. It defines a residual-calibrated uncertainty radius from data, physics, boundary/initial-condition, and optimization residuals. Under a conditional stability estimate, this yields an a posteriori reconstruction-error bound. A learned reconstruction is accepted only if R_learn ≤ R_base + ε_safe; otherwise the baseline is returned. High-probability certificates are derived for random collocation points, and the approach is tested on Poisson source recovery, inverse heat, tomography, coefficient identification, and stochastic validation.

Significance. If the conditional stability estimates can be made rigorous with explicit constants for the target inverse problems, the framework offers a practical certification layer that prevents harm from unreliable learned reconstructions while allowing certified improvements. This addresses a central reliability gap in physics-informed methods for ill-posed inverse problems.

major comments (2)

[Abstract] Abstract: The claim that the combined residuals yield an a posteriori reconstruction-error bound and deterministic uncertainty radius depends entirely on an unspecified conditional stability estimate. The manuscript invokes this estimate to convert residuals into the certified radius and the acceptance test but neither derives it, cites it with explicit constants, nor validates its tightness on the Poisson, heat, tomography, or coefficient-identification examples; this is load-bearing for the entire no-harm selector.
[Numerical tests] Numerical experiments (as described in the abstract): The tests show the selector accepting certified improvements and rejecting shifted or hallucinated candidates, but provide no direct verification that the residual-derived radius bounds the true reconstruction error on any example; without this, the certification property remains conditional on the unverified stability premise.

minor comments (1)

The safe margin ε_safe and the precise combination rule for the four residual types should be given explicit definitions and notation in the main text to improve readability.

Simulated Author's Rebuttal

2 responses · 0 unresolved

We thank the referee for the thorough review and for highlighting the central role of the conditional stability estimate. We address the two major comments point by point below.

read point-by-point responses

Referee: [Abstract] Abstract: The claim that the combined residuals yield an a posteriori reconstruction-error bound and deterministic uncertainty radius depends entirely on an unspecified conditional stability estimate. The manuscript invokes this estimate to convert residuals into the certified radius and the acceptance test but neither derives it, cites it with explicit constants, nor validates its tightness on the Poisson, heat, tomography, or coefficient-identification examples; this is load-bearing for the entire no-harm selector.

Authors: We agree that the conditional stability estimate is the key link converting residuals into a certified radius and that its explicit form is load-bearing. The manuscript treats the estimate as a standard assumption from inverse-problems theory rather than deriving it anew. In revision we will (i) add a short dedicated subsection that cites the relevant conditional-stability results for each of the four example classes, including references that supply explicit constants or rates where they exist in the literature, and (ii) state more explicitly that the no-harm guarantee is conditional on the validity of the cited estimate. Deriving sharp constants from first principles for every test problem lies outside the scope of a certification-layer paper; we therefore treat this as a citation task rather than a derivation task. revision: partial
Referee: [Numerical tests] Numerical experiments (as described in the abstract): The tests show the selector accepting certified improvements and rejecting shifted or hallucinated candidates, but provide no direct verification that the residual-derived radius bounds the true reconstruction error on any example; without this, the certification property remains conditional on the unverified stability premise.

Authors: The numerical section is intended to demonstrate the selector’s decision rule rather than to furnish an independent empirical proof of the stability estimate. We nevertheless accept that a direct comparison would strengthen the presentation. In the revised manuscript we will add, for every example where the ground truth is known, a supplementary plot or table that juxtaposes the residual-calibrated radius against the observed reconstruction error, thereby providing an empirical check on whether the bound is respected in practice. revision: yes

Circularity Check

0 steps flagged

No significant circularity; framework defined from residuals under external assumption

full rationale

The derivation defines the no-harm selector explicitly as the comparison R_learn ≤ R_base + ε_safe, where the radius itself is constructed from the sum of data/physics/BC/optimization residuals once a conditional stability estimate is assumed. This construction does not reduce any claimed prediction to a fitted parameter or to a self-citation chain; the stability estimate is treated as an external input rather than derived or smuggled via prior work by the same author. No self-definitional, fitted-input, or renaming patterns appear in the abstract or described framework. The result is therefore self-contained against the stated assumptions.

Axiom & Free-Parameter Ledger

0 free parameters · 1 axioms · 0 invented entities

The framework rests on an external conditional stability estimate that maps residuals to error; no free parameters or invented entities are introduced in the abstract, but the stability estimate itself functions as an unproven domain assumption for the certification step.

axioms (1)

domain assumption Existence of a conditional stability estimate converting summed residuals into a reconstruction-error bound
Invoked to obtain the a posteriori bound and uncertainty radius from the residuals

pith-pipeline@v0.9.1-grok · 5722 in / 1225 out tokens · 12191 ms · 2026-06-27T21:21:01.900136+00:00 · methodology

discussion (0)

Reference graph

Works this paper leans on

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[1] [1]

Engl, Martin Hanke, and Andreas Neubauer.Regularization of Inverse Problems, volume 375 of Mathematics and Its Applications

Heinz W. Engl, Martin Hanke, and Andreas Neubauer.Regularization of Inverse Problems, volume 375 of Mathematics and Its Applications. Kluwer Academic Publishers, Dordrecht, 1996

1996

[2] [2]

Springer, New York, 2 edition, 2011

Andreas Kirsch.An Introduction to the Mathematical Theory of Inverse Problems, volume 120 ofApplied Mathematical Sciences. Springer, New York, 2 edition, 2011

2011

[3] [3]

Springer, New York, 2005

Jari Kaipio and Erkki Somersalo.Statistical and Computational Inverse Problems, volume 160 ofApplied Mathematical Sciences. Springer, New York, 2005

2005

[4] [4]

Society for Industrial and Applied Mathematics, Philadelphia, 2010

Per Christian Hansen.Discrete Inverse Problems: Insight and Algorithms. Society for Industrial and Applied Mathematics, Philadelphia, 2010

2010

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Tikhonov and Vasiliy Y

Andrey N. Tikhonov and Vasiliy Y . Arsenin.Solutions of Ill-Posed Problems. Winston, Washington, DC, 1977

1977

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Oktem, and Carola-Bibiane Sch

Simon Arridge, Peter Maass, Ozan "Oktem, and Carola-Bibiane Sch"onlieb. Solving inverse problems using data-driven models.Acta Numerica, 28:1–174, 2019

2019

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Learned primal-dual reconstruction.IEEE Transactions on Medical Imaging, 37(6):1322–1332, 2018

Jonas Adler and Ozan "Oktem. Learned primal-dual reconstruction.IEEE Transactions on Medical Imaging, 37(6):1322–1332, 2018

2018

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Fourier neural operator for parametric partial differential equations.International Conference on Learning Representations, 2021

Zongyi Li, Nikola Kovachki, Kamyar Azizzadenesheli, Burigede Liu, Kaushik Bhattacharya, Andrew Stuart, and Anima Anandkumar. Fourier neural operator for parametric partial differential equations.International Conference on Learning Representations, 2021

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2020

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Maziar Raissi, Paris Perdikaris, and George Em Karniadakis. Physics-informed neural networks: A deep learning framework for solving forward and inverse problems involving nonlinear partial differential equations.Journal of Computational Physics, 378:686–707, 2019

2019

[11] [11]

Kevrekidis, Lu Lu, Paris Perdikaris, Sifan Wang, and Liu Yang

George Em Karniadakis, Ioannis G. Kevrekidis, Lu Lu, Paris Perdikaris, Sifan Wang, and Liu Yang. Physics- informed machine learning.Nature Reviews Physics, 3(6):422–440, 2021

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udiger Verf

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2013

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2015

[14] [14]

Andrew M. Stuart. Inverse problems: A bayesian perspective.Acta Numerica, 19:451–559, 2010

2010

[15] [15]

Scientific machine learning through physics-informed neural networks: Where we are and what’s next

Salvatore Cuomo, Vincenzo Schiano Di Cola, Fabio Giampaolo, Gianluigi Rozza, Maziar Raissi, and Francesco Piccialli. Scientific machine learning through physics-informed neural networks: Where we are and what’s next. Journal of Scientific Computing, 92(3):88, 2022

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Springer, New York, 2 edition, 2006

Victor Isakov.Inverse Problems for Partial Differential Equations, volume 127 ofApplied Mathematical Sciences. Springer, New York, 2 edition, 2006

2006

[21] [21]

Carleman estimates for parabolic equations and applications.Inverse Problems, 25(12):123013, 2009

Masahiro Yamamoto. Carleman estimates for parabolic equations and applications.Inverse Problems, 25(12):123013, 2009

2009

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Cambridge University Press, Cambridge, 2014

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Zhi-Quan Luo and Paul Tseng. Error bounds and convergence analysis of feasible descent methods: A general approach.Annals of Operations Research, 46(1):157–178, 1993

1993

[26] [26]

Proximal alternating linearized minimization for nonconvex and nonsmooth problems.Mathematical Programming, 146(1–2):459–494, 2014

Jérôme Bolte, Shoham Sabach, and Marc Teboulle. Proximal alternating linearized minimization for nonconvex and nonsmooth problems.Mathematical Programming, 146(1–2):459–494, 2014

2014

[27] [27]

Probability inequalities for sums of bounded random variables.Journal of the American Statistical Association, 58(301):13–30, 1963

Wassily Hoeffding. Probability inequalities for sums of bounded random variables.Journal of the American Statistical Association, 58(301):13–30, 1963. A Proofs of theoretical results This appendix gives the proofs of the theoretical results stated in the main text. The notation is the same as in Sections 2–7. Definitions and assumptions are not reproved. ...

1963