Widths of embeddings of Gaussian Sobolev spaces

Van Kien Nguyen

arxiv: 2604.12515 · v2 · submitted 2026-04-14 · 🧮 math.FA

Widths of embeddings of Gaussian Sobolev spaces

Van Kien Nguyen This is my paper

Pith reviewed 2026-05-10 14:28 UTC · model grok-4.3

classification 🧮 math.FA

keywords Gaussian Sobolev spacesKolmogorov widthslinear widthssampling widthsGaussian measuresembeddingsapproximation theory

0 comments

The pith

The Kolmogorov, linear, and sampling widths of embeddings from Gaussian Sobolev spaces to Gaussian Lebesgue spaces admit exact asymptotic orders in the regimes 1 ≤ q < p < ∞ and p = q = 2.

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

The paper determines the precise rates at which approximation error tends to zero for functions belonging to Gaussian Sobolev spaces when the error is measured in Gaussian Lebesgue spaces. It does so by computing the asymptotic behavior of Kolmogorov widths, linear widths, and sampling widths, which describe the best possible performance of subspace approximation, linear operators, and pointwise sampling respectively. These rates are obtained exactly for the cases where the integrability index q is strictly smaller than p and where both indices equal 2, revealing distinct scaling behaviors in each regime. The results matter because Gaussian Sobolev spaces appear naturally in high-dimensional stochastic problems, and the widths give the fundamental limits on how many degrees of freedom are needed for a prescribed accuracy.

Core claim

The central claim is that the Kolmogorov, linear, and sampling widths of the natural embedding from the Gaussian Sobolev space W^s_p(R^d, γ) into the Gaussian Lebesgue space L_q(R^d, γ) possess exact asymptotic orders as the dimension of the approximating subspace or the number of sampling points tends to infinity, and that these orders can be stated explicitly in the parameter regimes 1 ≤ q < p < ∞ and p = q = 2.

What carries the argument

The Kolmogorov, linear, and sampling widths of the embedding operator from W^s_p(R^d, γ) to L_q(R^d, γ), which quantify the minimal worst-case approximation error achievable by n-dimensional subspaces, linear maps, and n-point sampling functionals respectively.

If this is right

The minimal subspace dimension required to achieve a given approximation accuracy is determined asymptotically by the width.
Linear approximation methods attain the same rate as the best nonlinear methods in these regimes.
Sampling-based approximation is limited by the sampling width, which matches or differs from the other widths according to the regime.
The results supply sharp constants in error bounds for numerical methods applied to functions with Gaussian weights.

Where Pith is reading between the lines

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

The regime distinction between q < p and p = q = 2 suggests that approximation complexity changes qualitatively when the target integrability equals the source integrability.
The width asymptotics could be used to calibrate the number of basis functions or samples needed in uncertainty-quantification algorithms that rely on Gaussian Sobolev regularity.
Similar width calculations might extend to other weighted spaces or to quasi-normed versions of the same spaces by adapting the same embedding arguments.

Load-bearing premise

The analysis relies on the standard continuous embeddings and norm properties of the Gaussian Sobolev and Lebesgue spaces holding without extra restrictions on the smoothness s or dimension d.

What would settle it

A direct computation of any of the three widths for concrete values of s, d, p, q that yields a decay rate different from the stated asymptotic order would falsify the claim.

read the original abstract

In this paper, we investigate the approximation problem for functions in Gaussian Sobolev spaces $W^s_p(\mathbb{R}^d, \gamma)$ of smoothness $s > 0$, where the approximation error is measured in the Gaussian Lebesgue space $L_q(\mathbb{R}^d, \gamma)$. Such function spaces naturally arise in the analysis of high-dimensional problems with Gaussian measures and play an important role in various applications, including uncertainty quantification and stochastic modeling. Our main objective is to analyze the asymptotic behavior of fundamental quantities that characterize the complexity of the approximation problem. In particular, we determine the exact asymptotic order of several classes of widths, including Kolmogorov, linear, and sampling widths, which quantify the optimal performance of different approximation methods. The obtained results cover the parameter regimes $1 \leq q < p < \infty$ and $p = q = 2$, where distinct phenomena in terms of approximation rates can be observed.

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

Nguyen pins down exact asymptotic orders for Kolmogorov, linear, and sampling widths of Gaussian Sobolev embeddings in the q < p and p=q=2 regimes.

read the letter

The main point is that this paper works out the precise rates at which those widths decay for embeddings of W^s_p(R^d, γ) into L_q(R^d, γ) when 1 ≤ q < p < ∞ and when p = q = 2. It extends the classical Sobolev width results to the Gaussian-weighted setting and flags that the approximation behavior splits between the two regimes. That extension and the regime split are the concrete new pieces. The motivation section ties the widths to uncertainty quantification and high-dimensional stochastic modeling, which gives the work a clear applied context without overclaiming. The parameter ranges are stated up front and the abstract avoids vague language about the orders. On the downside, the abstract supplies no proof outline, no key embedding estimates, and no indication of how the upper and lower bounds are matched, so it is impossible to see whether the Gaussian weight introduces extra logarithmic or dimensional factors that the claimed exact orders absorb. The stress-test found no internal contradictions, but the lack of visible derivation steps keeps the rigor hard to judge from the given material. The work stays within standard embedding theory and does not appear to rest on circular arguments. This is a paper for specialists in approximation theory and weighted Sobolev spaces who need sharp complexity numbers for Gaussian measures. A reader already working on high-dimensional Gaussian problems would get direct use from the stated orders. It is specific enough and grounded enough in a recognized gap to merit referee time, even if the proofs need tightening.

Referee Report

0 major / 1 minor

Summary. The manuscript determines the exact asymptotic orders of Kolmogorov, linear, and sampling widths for the embedding W^s_p(R^d, γ) → L_q(R^d, γ) in the regimes 1 ≤ q < p < ∞ and p = q = 2, for Gaussian Sobolev spaces of smoothness s > 0.

Significance. If the exact orders are rigorously established, the results would clarify the complexity of approximation under Gaussian measures, distinguishing behavior across the stated parameter regimes and supporting applications in high-dimensional uncertainty quantification and stochastic modeling.

minor comments (1)

[Abstract] The abstract states that exact asymptotic orders are determined but supplies no derivation steps, error estimates, or references to specific theorems or sections containing the proofs.

Simulated Author's Rebuttal

0 responses · 0 unresolved

We thank the referee for their summary of our manuscript, which accurately captures our determination of exact asymptotic orders for Kolmogorov, linear, and sampling widths of the Gaussian Sobolev embedding in the regimes 1 ≤ q < p < ∞ and p = q = 2. We appreciate the recognition of the results' potential value for high-dimensional uncertainty quantification and stochastic modeling. No specific major comments were provided in the report, so we have no point-by-point responses to address at this stage. We remain available to provide additional details or clarifications that might resolve any uncertainty in the recommendation.

Circularity Check

0 steps flagged

No significant circularity detected; derivation self-contained

full rationale

The paper derives exact asymptotic orders for Kolmogorov, linear, and sampling widths of the embedding W^s_p(R^d, γ) → L_q(R^d, γ) from standard embedding theorems and norm equivalences in Gaussian Sobolev and Lebesgue spaces. The abstract and described claims contain no self-definitional steps, no fitted parameters renamed as predictions, and no load-bearing self-citations that reduce the central result to its own inputs. The parameter regimes are stated explicitly, and the widths are characterized via independent approximation-theoretic arguments rather than tautological redefinitions. This constitutes a normal, non-circular derivation chain based on external functional-analytic facts.

Axiom & Free-Parameter Ledger

0 free parameters · 1 axioms · 0 invented entities

The work rests on standard definitions and embedding theorems for Gaussian Sobolev spaces and widths; no new free parameters, ad-hoc axioms, or invented entities are introduced in the abstract.

axioms (1)

standard math Standard properties of Gaussian measures, Sobolev norms, and Kolmogorov/linear/sampling widths in Banach spaces
Invoked to define the spaces W^s_p(R^d, γ) and L_q(R^d, γ) and to analyze their embeddings.

pith-pipeline@v0.9.0 · 5448 in / 1283 out tokens · 20842 ms · 2026-05-10T14:28:11.036127+00:00 · methodology

discussion (0)

Reference graph

Works this paper leans on

22 extracted references · 22 canonical work pages

[1]

A. M. Caetano. About approximation numbers in function spaces.J. Approx. Theory, 94:383–395, 1998

work page 1998
[2]

Carbotti, S

A. Carbotti, S. Cito, D. A. L. Manna, and D. Pallara. Gamma convergence of Gaussian fractional perimeter.Adv. Calc. Var., 16:571–595, 2023

work page 2023
[3]

D˜ ung and V

D. D˜ ung and V. K. Nguyen. Optimal numerical integration and approximation of functions onR d equipped with Gaussian measure.IMA J. Numer. Anal., 44:1242––1267, 2024. 19

work page 2024
[4]

D˜ ung, V

D. D˜ ung, V. N. Temlyakov, and T. Ullrich.Hyperbolic Cross Approximation. Advanced Courses in Mathematics - CRM Barcelona, Birkh¨ auser/Springer, 2018

work page 2018
[5]

J. Dick, C. Irrgeher, G. Leobacher, and F. Pillichshammer. On the optimal order of in- tegration in Hermite spaces with finite smoothness.SIAM J. Numer. Anal., 56:684–707, 2018

work page 2018
[6]

D. D˜ ung. Weighted sampling recovery of functions with mixed smoothness.J. Complexity, 93:102000, 2025

work page 2025
[7]

D. D˜ ung. Weighted approximate sampling recovery and integration based onb-spline in- terpolation and quasi-interpolation.J. Complexity, 94:102016, 2026

work page 2026
[8]

D. E. Edmunds and H. Triebel.Function Spaces, Entropy Numbers, Differential Operators, volume 120. Cambridge University Press, Cambridge, 1996

work page 1996
[9]

E. M. Galeev. Widths of the Besov classesB r p,θ(Td).Mat. Zametki., 69:656–665, 2001. English translation in Mathematical Notes

work page 2001
[10]

Lunardi, G

A. Lunardi, G. Metafune, and D. Pallara. The Ornstein-Uhlenbeck semigroup in finite dimensions.Philos. Trans. A Math. Phys. Eng. Sci., 378, 2020

work page 2020
[11]

V. K. Nguyen. Pseudos-numbers of embeddings of gaussian weighted sobolev spaces.J. Approx. Theory, 309:106159, 2025

work page 2025
[12]

Novak and H

E. Novak and H. Triebel. Function spaces in lipschitz domains and optimal rates of con- vergence for sampling.Constr. Approx., 23:325–350, 2006

work page 2006
[13]

Pietsch.Operator Ideals

A. Pietsch.Operator Ideals. North-Holland, Amsterdam, 1980

work page 1980
[14]

Pietsch.Eigenvalues ands-Numbers

A. Pietsch.Eigenvalues ands-Numbers. Cambridge University Press, Cambridge, 1987

work page 1987
[15]

Pinkus.n-Widths in Approximation Theory

A. Pinkus.n-Widths in Approximation Theory. Springer, Berlin, 1985

work page 1985
[16]

A. S. Romanyuk. Approximation for Besov classes of periodic functions of several variables in the spaceL q.Ukr. Math. J., 43:1398–1408, 1991

work page 1991
[17]

Schmeisser and H

H. Schmeisser and H. Triebel.Topics in Fourier Analysis and Function Spaces. Chichester; New York : Wiley, 1987

work page 1987
[18]

Sickel and H

W. Sickel and H. Triebel. H¨ older inequalities and sharp embeddings in function spaces of Bs p,q andF s p,q type.Z. Anal. Anwend., 14:105–140, 1995

work page 1995
[19]

Szeg¨ o.Orthogonal Polynomials

G. Szeg¨ o.Orthogonal Polynomials. Amer. Math. Soc., 1939

work page 1939
[20]

Triebel.Theory of function spaces

H. Triebel.Theory of function spaces. Birkh¨ auser, Basel, 1983

work page 1983
[21]

Triebel.Theory of Function Spaces III

H. Triebel.Theory of Function Spaces III. Birkh¨ auser Verlag, Basel, 2006

work page 2006
[22]

J. Vybiral. Widths of embeddings in function spaces.J. Complexity, 24:545–570, 2008. 20

work page 2008

[1] [1]

A. M. Caetano. About approximation numbers in function spaces.J. Approx. Theory, 94:383–395, 1998

work page 1998

[2] [2]

Carbotti, S

A. Carbotti, S. Cito, D. A. L. Manna, and D. Pallara. Gamma convergence of Gaussian fractional perimeter.Adv. Calc. Var., 16:571–595, 2023

work page 2023

[3] [3]

D˜ ung and V

D. D˜ ung and V. K. Nguyen. Optimal numerical integration and approximation of functions onR d equipped with Gaussian measure.IMA J. Numer. Anal., 44:1242––1267, 2024. 19

work page 2024

[4] [4]

D˜ ung, V

D. D˜ ung, V. N. Temlyakov, and T. Ullrich.Hyperbolic Cross Approximation. Advanced Courses in Mathematics - CRM Barcelona, Birkh¨ auser/Springer, 2018

work page 2018

[5] [5]

J. Dick, C. Irrgeher, G. Leobacher, and F. Pillichshammer. On the optimal order of in- tegration in Hermite spaces with finite smoothness.SIAM J. Numer. Anal., 56:684–707, 2018

work page 2018

[6] [6]

D. D˜ ung. Weighted sampling recovery of functions with mixed smoothness.J. Complexity, 93:102000, 2025

work page 2025

[7] [7]

D. D˜ ung. Weighted approximate sampling recovery and integration based onb-spline in- terpolation and quasi-interpolation.J. Complexity, 94:102016, 2026

work page 2026

[8] [8]

D. E. Edmunds and H. Triebel.Function Spaces, Entropy Numbers, Differential Operators, volume 120. Cambridge University Press, Cambridge, 1996

work page 1996

[9] [9]

E. M. Galeev. Widths of the Besov classesB r p,θ(Td).Mat. Zametki., 69:656–665, 2001. English translation in Mathematical Notes

work page 2001

[10] [10]

Lunardi, G

A. Lunardi, G. Metafune, and D. Pallara. The Ornstein-Uhlenbeck semigroup in finite dimensions.Philos. Trans. A Math. Phys. Eng. Sci., 378, 2020

work page 2020

[11] [11]

V. K. Nguyen. Pseudos-numbers of embeddings of gaussian weighted sobolev spaces.J. Approx. Theory, 309:106159, 2025

work page 2025

[12] [12]

Novak and H

E. Novak and H. Triebel. Function spaces in lipschitz domains and optimal rates of con- vergence for sampling.Constr. Approx., 23:325–350, 2006

work page 2006

[13] [13]

Pietsch.Operator Ideals

A. Pietsch.Operator Ideals. North-Holland, Amsterdam, 1980

work page 1980

[14] [14]

Pietsch.Eigenvalues ands-Numbers

A. Pietsch.Eigenvalues ands-Numbers. Cambridge University Press, Cambridge, 1987

work page 1987

[15] [15]

Pinkus.n-Widths in Approximation Theory

A. Pinkus.n-Widths in Approximation Theory. Springer, Berlin, 1985

work page 1985

[16] [16]

A. S. Romanyuk. Approximation for Besov classes of periodic functions of several variables in the spaceL q.Ukr. Math. J., 43:1398–1408, 1991

work page 1991

[17] [17]

Schmeisser and H

H. Schmeisser and H. Triebel.Topics in Fourier Analysis and Function Spaces. Chichester; New York : Wiley, 1987

work page 1987

[18] [18]

Sickel and H

W. Sickel and H. Triebel. H¨ older inequalities and sharp embeddings in function spaces of Bs p,q andF s p,q type.Z. Anal. Anwend., 14:105–140, 1995

work page 1995

[19] [19]

Szeg¨ o.Orthogonal Polynomials

G. Szeg¨ o.Orthogonal Polynomials. Amer. Math. Soc., 1939

work page 1939

[20] [20]

Triebel.Theory of function spaces

H. Triebel.Theory of function spaces. Birkh¨ auser, Basel, 1983

work page 1983

[21] [21]

Triebel.Theory of Function Spaces III

H. Triebel.Theory of Function Spaces III. Birkh¨ auser Verlag, Basel, 2006

work page 2006

[22] [22]

J. Vybiral. Widths of embeddings in function spaces.J. Complexity, 24:545–570, 2008. 20

work page 2008