Structure-Aware Tensorial Model Reduction

Anthony Gruber; Arjun Vijaywargia; Eric C. Cyr

arxiv: 2604.26280 · v1 · submitted 2026-04-29 · 🧮 math.NA · cs.NA· math.DS

Structure-Aware Tensorial Model Reduction

Arjun Vijaywargia , Eric C. Cyr , Anthony Gruber This is my paper

Pith reviewed 2026-05-07 13:05 UTC · model grok-4.3

classification 🧮 math.NA cs.NAmath.DS

keywords reduced-order modelsTucker factorizationparameterized PDEsradial basis function interpolationGalerkin projectionnonlinear basisKolmogorov n-widthtensorial model reduction

0 comments

The pith

Tensor factorization lets reduced bases for parameterized PDEs vary nonlinearly with parameters by encoding snapshots offline and interpolating online.

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

This paper develops a two-stage projection-based reduced-order modeling technique for parameterized partial differential equations. Snapshots of solutions are first compressed offline using multi-linear Tucker factorization. In the online phase, radial basis functions interpolate the encoded states to assemble a reduced basis that changes with the PDE parameters, after which the basis is orthonormalized with respect to a general discrete inner product for use in Galerkin projection. Error estimates support the approach, and tests on cases including three-dimensional Maxwell's equations show gains over linear-basis and prior tensorial methods when nonlinearity is strong or training data is limited. A reader would care because the method targets the practical regimes where standard reduced models lose accuracy or require excessive samples.

Core claim

The central claim is that Tucker factorization of solution snapshots permits the rapid online construction of a parameter-dependent reduced basis via radial basis function interpolation of the encoded states. When this basis is orthonormalized against a general discrete inner product, the resulting Galerkin reduced-order model satisfies representation and projection error bounds even under sparse parameter sampling. Numerical examples demonstrate that the resulting nonlinear-basis ROM improves accuracy relative to monolithic linear bases and earlier tensorial techniques precisely in the highly nonlinear and data-limited regimes typical of realistic PDE applications.

What carries the argument

Multi-linear Tucker factorization of solution snapshots, which encodes states so that radial basis function interpolation can rapidly produce a nonlinearly parameter-varying orthonormal reduced basis for Galerkin projection.

Load-bearing premise

The Tucker-encoded states admit accurate radial basis function interpolation and the orthonormalization step preserves error bounds sufficiently when parameter samples are sparse.

What would settle it

If the observed ROM error on a nonlinear PDE with sparse parameter samples exceeds the derived bounds or fails to improve on linear-basis performance, the validity of the interpolation and orthonormalization extensions would be refuted.

Figures

Figures reproduced from arXiv: 2604.26280 by Anthony Gruber, Arjun Vijaywargia, Eric C. Cyr.

**Figure 1.** Figure 1: Normalized singular value decay for the three bases view at source ↗

**Figure 2.** Figure 2: Relative M-weighted error in the ROM solutions to the heat system as a function of reduced basis dimension r, considered over all training (left) and testing (right) parameters. For each method, solid lines denote the median ROM error across parameter instances while dashed lines denote the median projection error. Shaded bands indicate the interquartile range of the ROM error. solution. Moreover, while bo… view at source ↗

**Figure 3.** Figure 3: Top row: FOM and ROM solutions to the heat system at terminal time view at source ↗

**Figure 4.** Figure 4: Relative MW -weighted error in the ROM solutions to the wave system as a function of reduced basis dimension r, considered over all training (left) and testing (right) parameters. Top row: displacement error; bottom row: momentum error. For each method, solid lines denote the median ROM error across parameter instances while dashed lines denote the median projection error. Shaded bands indicate the interqu… view at source ↗

**Figure 5.** Figure 5: Top row: FOM and ROM displacement solutions to the wave system at terminal time view at source ↗

**Figure 6.** Figure 6: Relative ME-weighted L 2 error in the ROM solutions to the Maxwell system as a function of reduced basis dimension r, considered over all training (left) and testing (right) parameters. Top row: electric field error; bottom row: magnetic field error. For each method, solid lines denote the median ROM error and dashed lines denote the median projection error. Shaded bands indicate the interquartile range of… view at source ↗

**Figure 7.** Figure 7: Magnitude and components of Eh at τ = 2.5 on the slice z = 0.5 obtained from the FOM and ROM solutions to the Maxwell system for a sample test parameter with ROM dimension r = 10. The RBF and MO ROMs yield small errors of 0.88% and 4.2%, while the monolithic ROM produces an extremely large error of 36.9%. 29 view at source ↗

**Figure 8.** Figure 8: Magnitude and components of Bh at τ = 2.5 on the slice z = 0.5 obtained from the FOM and ROM solutions to the Maxwell system for the same test parameter as view at source ↗

read the original abstract

This work investigates a two-stage method for constructing projection-based reduced-order models (ROMs) of parameterized partial differential equations (PDEs). Based on established tensorial ROM methodology, the proposed approach reduces dimensionality offline by encoding solution snapshots using a multi-linear Tucker factorization, so that a reduced basis which varies nonlinearly with PDE parameters can be rapidly constructed online and used in a Galerkin ROM. Two novel extensions of this strategy, tailored to the cases of structured PDEs and sparse parameter sampling, are presented: the construction of reduced bases orthonormalized with respect to a general discrete inner product, and the interpolation of encoded states via radial basis functions. Basic representation and ROM error estimates are presented demonstrating the validity of these modifications, and the approach is challenged on examples where monolithic-basis ROMs are known to struggle, including a realistic instance of Maxwell's equations in 3D. Results suggest that the proposed nonlinear basis ROM can effectively mitigate linear restrictions on Kolmogorov $n$-width while improving upon previous tensorial ROM technology, particularly in the highly nonlinear and data-limited regimes characteristic of practical use cases.

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 adds RBF interpolation and general inner-product orthonormalization to tensorial ROMs for better handling of nonlinear structured PDEs with sparse data, though the error analysis may miss the interpolation residual.

read the letter

Here's the quick read on arXiv:2604.26280. The paper's main contribution is extending tensorial reduced-order models with two targeted modifications: orthonormal bases using a general discrete inner product and radial basis function interpolation on the Tucker-encoded states. This setup allows a nonlinearly parameter-dependent reduced basis to be built quickly online from offline snapshots, which helps when the solution manifold is not well approximated by a fixed linear space. The approach is presented clearly for structured PDEs and sparse parameter regimes. The authors include basic error estimates for both the representation and the resulting Galerkin ROM, and they test it on examples including a 3D Maxwell problem where standard linear bases are known to perform poorly. The results point to improvements in accuracy for highly nonlinear cases with limited data, which aligns with practical engineering needs. That said, the error estimates appear focused on the Tucker factorization and orthonormalization steps. The online phase relies on RBF interpolation of the encoded states, and it's not obvious whether the bounds include a term that controls the interpolation error when the parameter samples are sparse. Without that, it's hard to know how much of the observed gain comes from the structure-aware encoding versus the specific choice of RBF shape parameters. The paper would be stronger with some analysis or numerical checks on that residual. This kind of work is useful for people already working in projection-based model reduction for parameterized PDEs. Someone looking to adapt tensor methods to real-world problems with nonlinearity and data scarcity will get concrete ideas from the extensions and the numerical setup. The thinking is straightforward and engages with the relevant literature on tensorial ROMs without overclaiming. It is worth sending to peer review so that experts can verify the estimates and the numerical claims in detail. I would recommend proceeding with review rather than a desk reject.

Referee Report

2 major / 1 minor

Summary. The manuscript introduces a two-stage projection-based reduced-order modeling approach for parameterized PDEs. Offline, solution snapshots are encoded via multi-linear Tucker factorization to reduce dimensionality; online, a parameter-dependent reduced basis is constructed rapidly via radial basis function (RBF) interpolation of the encoded states and used in a Galerkin ROM. Two extensions are proposed: orthonormalization of the reduced basis with respect to a general discrete inner product (for structured PDEs) and RBF interpolation (for sparse parameter sampling). Basic representation and ROM error estimates are derived to support these modifications, and the method is demonstrated on examples including a 3D Maxwell's equations instance, claiming that the nonlinear basis mitigates Kolmogorov n-width limitations and outperforms prior tensorial ROMs in highly nonlinear, data-limited regimes.

Significance. If the error estimates are shown to be complete and the numerical results are robust, the work would represent a useful incremental advance in tensorial ROM methodology, extending it to practical settings with sparse data and strong nonlinearity where linear bases are known to converge slowly.

major comments (2)

[error estimates section] The basic ROM error estimates (described in the abstract and the section presenting them) do not include an explicit additive term bounding the RBF interpolation residual of the Tucker-encoded states. Since the online phase replaces exact encoded states with RBF interpolation, and the target regime is sparse parameter sampling, this omission is load-bearing for the validity claims in data-limited nonlinear cases.
[numerical results] Table or figure presenting the 3D Maxwell results: no quantitative discussion is provided on the sensitivity of the reported improvements to post-hoc choices such as Tucker ranks or RBF shape parameters, which directly affects the assessment of whether gains are due to the structure-aware reduction or to interpolation artifacts.

minor comments (1)

[abstract] The abstract and introduction would benefit from a short statement of the specific quantitative error metrics used to verify the representation and ROM estimates.

Simulated Author's Rebuttal

2 responses · 0 unresolved

We thank the referee for their careful reading and constructive feedback on the manuscript. We address each major comment point by point below, indicating where revisions will be made to strengthen the presentation.

read point-by-point responses

Referee: [error estimates section] The basic ROM error estimates (described in the abstract and the section presenting them) do not include an explicit additive term bounding the RBF interpolation residual of the Tucker-encoded states. Since the online phase replaces exact encoded states with RBF interpolation, and the target regime is sparse parameter sampling, this omission is load-bearing for the validity claims in data-limited nonlinear cases.

Authors: We agree that the current basic error estimates focus on the Tucker factorization and Galerkin projection steps without an explicit term for the RBF interpolation residual. This is a valid observation, particularly given the emphasis on sparse parameter sampling. We will revise the error estimates section to incorporate an additive bound on the RBF interpolation residual of the encoded states, thereby supporting the validity claims more completely in the data-limited regime. revision: yes
Referee: [numerical results] Table or figure presenting the 3D Maxwell results: no quantitative discussion is provided on the sensitivity of the reported improvements to post-hoc choices such as Tucker ranks or RBF shape parameters, which directly affects the assessment of whether gains are due to the structure-aware reduction or to interpolation artifacts.

Authors: The referee is correct that the 3D Maxwell results section lacks explicit quantitative sensitivity analysis with respect to Tucker ranks and RBF shape parameters. While the selected values were determined through standard cross-validation procedures to balance accuracy and efficiency, we acknowledge that additional discussion would help rule out interpolation artifacts. In the revised manuscript we will add a concise paragraph summarizing the sensitivity of the reported errors to moderate variations in these hyperparameters, drawing on the existing computational data. revision: yes

Circularity Check

0 steps flagged

No circularity in derivation chain

full rationale

The paper extends established tensorial ROM methodology via Tucker encoding of snapshots, RBF interpolation of encoded states, and orthonormalization w.r.t. a general inner product. It derives basic representation and ROM error estimates to support the modifications and validates on Maxwell and other examples. No load-bearing step reduces by construction to a fitted quantity, self-definition, or self-citation chain; the error estimates are presented as independent demonstrations of validity rather than tautological restatements of inputs. The central claim of mitigating Kolmogorov n-width restrictions therefore rests on the new estimates and numerical results, not on circular reduction.

Axiom & Free-Parameter Ledger

0 free parameters · 2 axioms · 0 invented entities

The approach rests on the assumption that solution manifolds of the target PDEs admit low-rank Tucker structure and that RBF interpolation in the encoded space is sufficiently smooth. No new physical entities are postulated.

axioms (2)

domain assumption The solution snapshots admit a low-rank multi-linear Tucker factorization whose factor matrices can be interpolated accurately by radial basis functions.
Invoked in the description of the offline encoding and online basis construction stages.
domain assumption Error estimates derived for the modified orthonormalization and interpolation steps remain valid under the sparse sampling regime.
Stated as 'basic representation and ROM error estimates are presented'.

pith-pipeline@v0.9.0 · 5490 in / 1606 out tokens · 44811 ms · 2026-05-07T13:05:39.559896+00:00 · methodology

discussion (0)

Reference graph

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B. M. Afkham, A. Bhatt, B. Haasdonk, and J. S. Hesthaven. Symplectic model-reduction with a weighted inner product, 2018

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Greif and K

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Gruber, M

A. Gruber, M. Gunzburger, L. Ju, and Z. Wang. Energetically consistent model reduction for metriplec- tic systems.Computer Methods in Applied Mechanics and Engineering, 404:115709, 2023

work page 2023

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Gruber and I

A. Gruber and I. Tezaur. Canonical and noncanonical Hamiltonian operator inference.Computer Methods in Applied Mechanics and Engineering, 416:116334, 2023. 26 Structure-Aware Tensorial Model Reduction Vijaywargiya, Cyr, and Gruber

work page 2023

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Gruber and I

A. Gruber and I. Tezaur. Variationally consistent Hamiltonian model reduction.SIAM Journal on Applied Dynamical Systems, 24(1):376–414, 2025

work page 2025

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J. S. Hesthaven, C. Pagliantini, and G. Rozza. Reduced basis methods for time-dependent problems. Acta Numerica, 31:265–345, 2022

work page 2022

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O. Knill. The dirac operator of a graph, 2013

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Le Clainche, F

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