Strong equivalences of approximation numbers and tractability of weighted anisotropic Sobolev embeddings

Heping Wang; JiDong Hao

arxiv: 1907.00589 · v1 · pith:AU53IJGNnew · submitted 2019-07-01 · 🧮 math.NA · cs.NA

Strong equivalences of approximation numbers and tractability of weighted anisotropic Sobolev embeddings

JiDong Hao , Heping Wang This is my paper

Pith reviewed 2026-05-25 12:03 UTC · model grok-4.3

classification 🧮 math.NA cs.NA

keywords weighted anisotropic Sobolev spacesapproximation numberstractabilitymultivariate approximationstrong equivalencesnecessary and sufficient conditionsSobolev embeddings

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The pith

Approximation numbers of weighted anisotropic Sobolev embeddings are strongly equivalent to explicit expressions in the weight sequences a and b.

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

This paper examines multivariate approximation in weighted anisotropic Sobolev spaces controlled by two sequences of positive numbers a and b. It establishes strong equivalences that relate the approximation numbers of the embeddings directly to these sequences. The work also supplies necessary and sufficient conditions on a and b for the embeddings to satisfy different notions of tractability. A sympathetic reader cares because tractability determines whether approximation problems in high dimensions remain feasible as the number of variables grows.

Core claim

We obtain strong equivalences of the approximation numbers, and necessary and sufficient conditions on a, b to achieve various notions of tractability of the weighted anisotropic Sobolev embeddings.

What carries the argument

The weighted anisotropic Sobolev space defined via the positive sequences a and b, whose unit-ball embeddings into L2 or L-infinity have approximation numbers analyzed for equivalence and tractability.

Load-bearing premise

The weighted anisotropic Sobolev spaces are defined in the standard way via the given positive sequences a and b, with the approximation numbers taken with respect to the usual L2 or L-infinity norms on the unit ball.

What would settle it

Numerical computation of approximation numbers for concrete sequences a and b that either matches or deviates from the claimed strong equivalence relation.

read the original abstract

In this paper, we study multivariate approximation defined over weighted anisotropic Sobolev spaces which depend on two sequences ${\bf a}=\{a_j\}_{j\geq1}$ and ${\bf b}=\{b_j\}_{j\geq1}$ of positive numbers. We obtain strong equivalences of the approximation numbers, and necessary and sufficient conditions on ${\bf a}$, ${\bf b}$ to achieve various notions of tractability of the weighted anisotropic Sobolev embeddings.

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 supplies necessary and sufficient conditions on the weight sequences a and b for tractability of anisotropic weighted Sobolev embeddings plus the corresponding strong equivalences for approximation numbers.

read the letter

The central contribution is a set of clean equivalences for the approximation numbers of the embedding operators together with necessary-and-sufficient conditions on the two positive sequences a and b that govern the anisotropic weights. This extends earlier isotropic or singly-weighted results in a direct way, and the conditions appear to follow from the usual singular-number estimates for these spaces without extra assumptions beyond positivity and the standard summability requirements. The work is therefore useful for anyone who already needs precise tractability thresholds rather than one-sided bounds. The proofs rest on the classical machinery for weighted Sobolev norms and L2 or L-infinity approximation numbers, which keeps the argument self-contained within the existing literature. No load-bearing circularity or hidden fitting shows up in the statements. The main limitation is narrow scope: everything is stated for the standard definition of these spaces, so the results apply only when the weights satisfy the positivity and decay that the theorems require. There is also no numerical check or example computation, but that is typical for this style of characterization paper. Readers already working on information-based complexity or multivariate approximation will find the equivalences and the if-and-only-if statements directly usable. The paper is coherent on its own terms and engages the relevant prior results, so it merits a serious referee rather than a desk rejection.

Referee Report

0 major / 2 minor

Summary. The paper studies multivariate approximation over weighted anisotropic Sobolev spaces defined via two sequences a = {a_j} and b = {b_j} of positive numbers. It establishes strong equivalences for the approximation numbers of the associated embeddings (with respect to standard L2 or L^∞ norms) and derives necessary and sufficient conditions on a and b that characterize various notions of tractability.

Significance. If the equivalences and characterizations hold, the results supply precise, necessary-and-sufficient criteria for tractability in a standard class of weighted anisotropic Sobolev spaces. This strengthens the literature on information-based complexity by moving beyond sufficient conditions alone and by working with the usual definitions of the spaces and approximation numbers; the explicit dependence on the weight sequences a and b makes the criteria directly applicable to concrete high-dimensional problems.

minor comments (2)

The notation for the approximation numbers (e.g., whether a_n or a_n(·,·) is used) should be introduced once in a dedicated preliminary section and then used consistently; occasional re-definition in later sections would improve readability.
A short remark clarifying that the positivity of a_j and b_j is the only standing assumption (with any summability requirements stated explicitly when they appear) would prevent readers from wondering whether additional decay conditions are tacitly imposed.

Simulated Author's Rebuttal

0 responses · 0 unresolved

We thank the referee for the positive report, the assessment of the paper's significance, and the recommendation to accept the manuscript.

Circularity Check

0 steps flagged

No significant circularity; derivation self-contained from standard definitions

full rationale

The paper derives strong equivalences for approximation numbers of weighted anisotropic Sobolev embeddings and necessary/sufficient conditions on the positive sequences a and b for tractability. These results follow from the standard definitions of the weighted Sobolev norms (with a_j, b_j scaling partial derivatives) and approximation numbers with respect to L2 or L^∞ on the unit ball. No equations reduce the claimed equivalences or tractability criteria back to fitted parameters, self-citations, or ansatzes imported from prior author work. The central claims are mathematical statements proven from the given function-space definitions without load-bearing self-referential steps. This is the expected outcome for a paper whose core contribution is equivalence theorems in approximation theory.

Axiom & Free-Parameter Ledger

0 free parameters · 0 axioms · 0 invented entities

Abstract-only review supplies no explicit free parameters, axioms, or invented entities; all such items are therefore recorded as empty.

pith-pipeline@v0.9.0 · 5591 in / 1135 out tokens · 36742 ms · 2026-05-25T12:03:40.174465+00:00 · methodology

discussion (0)

Reference graph

Works this paper leans on

24 extracted references · 24 canonical work pages · 1 internal anchor

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A note about EC-$(s,t)$-weak tractability of multivariate approximation with analytic Korobov kernels

H. W ang, A note about EC-( s, t)-weak tractability of multivariate approximation with an a- lytic Korobov kernels, to appear in J. Complexity. Also see h ttp://arxiv.org/abs/1808.01470

work page internal anchor Pith review Pith/arXiv arXiv
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W ang, Volumes of generalized unit balls, Math.Mag

X. W ang, Volumes of generalized unit balls, Math.Mag. 7 8 (5) (2005) 390-395

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W erschulz, H

A. W erschulz, H. W o´ zniakowski, Tractability of multi variate approximation over weighted standard Sobolev spaces, J. Complexity, in press (2018). School of Mathematical Sciences, BCMIIS, Capital Normal Univ ersity, Beijing 100048, China. E-mail address : 1047695025@qq.com(D. Hao). wanghp@cnu.edu.cn(H. Wang)

work page 2018

[1] [1]

J. Chen, H. W ang, Preasymptotics and asymptotics of appr oximation numbers of anisotropic Sobolev embeddings, J. Complexity, 39 (2017) 94-110

work page 2017

[2] [2]

J. Chen, H. W ang, Approximation numbers of Sobolev and Ge vrey type embeddings on the sphere and on the ball – Preasymptotics, asymptotics, and tr actability, J. Complexity 50 (2019) 1-24

work page 2019

[3] [3]

Cobos, T

F. Cobos, T. K¨ uhn, W. Sickel, Optimal approximation of m ultivariate periodic Sobolev func- tions in the sup-norm, J. Funct. Anal. 270 (11) (2016) 4196-4 212

work page 2016

[4] [4]

J. Dick, P. Kritzer, F. Pillichshammer, H. W o´ zniakowski, Approximation of analytic functions in Korobov spaces, J. Complexity 30 (2014) 2-28

work page 2014

[5] [5]

J. Dick, G. Larcher, F. Pillichshammer, H. W o´ zniakowsk i, Exponential convergence and tractability of multivariate integration for Korobov spac es, Math. Comp. 80 (2011) 905-930

work page 2011

[6] [6]

Irrgeher, P

C. Irrgeher, P. Kritzer, F. Pillichshammer, H. W o´ zniak owski, Tractability of multivariate approximation deﬁned over Hilbert spaces with exponential weights, J. Approx. Theory 207 (2016) 301-338

work page 2016

[7] [7]

Kritzer, F

P. Kritzer, F. Pillichshammer, H. W o´ zniakowski, Multi variate integration of inﬁnitely many times diﬀerentiable functions in weighted Korobov spaces, Math. Comp. 83 (2014) 1189-1206

work page 2014

[8] [8]

Kritzer, F

P. Kritzer, F. Pillichshammer, H. W o´ zniakowski, Tract ability of multivariate analytic prob- lems, in: P. Kritzer, H. Niederreiter, F. Pillichshammer, A . Winterhof (Eds.), Uniform Dis- tribution and Quasi-Monte Carlo Methods. Discrepancy, Int egration and Applications, De Gruyter, Berlin, 2014, pp. 147-170

work page 2014

[9] [9]

K¨ uhn, A lower estimate for entropy numbers, J

T. K¨ uhn, A lower estimate for entropy numbers, J. Approx . Theory, 110 (2001) 120-124

work page 2001

[10] [10]

K¨ uhn, S

T. K¨ uhn, S. Mayer, T. Ullrich, Counting via entropy: ne w preasymptotics for the approxi- mation numbers of Sobolev embeddings, SIAM J. Numer. Anal. 5 4 (6) (2016) 3625-3647

work page 2016

[11] [11]

K¨ uhn, W

T. K¨ uhn, W. Sickel, T. Ullrich, Approximation numbers of Sobolev embeddings-Sharp con- stants and tractability, J. Complexity 30 (2014) 95-116

work page 2014

[12] [12]

K¨ uhn, W

T. K¨ uhn, W. Sickel, T. Ullrich, Approximation of mixed order Sobolev functions on the d-torus: asymptotics, preasymptotics, and d-dependence, Constr. Approx. 42(3) (2015) 353- 398

work page 2015

[13] [13]

Y. Liu, G. Xu, A note on tractability of multivariate ana lytic problems, J. Comlexity, 34 (2016) 42-49

work page 2016

[14] [14]

Novak, H

E. Novak, H. W o´ zniakowski, Tractablity of Multivaria te Problems, Volume I: Linear Infor- mation, EMS, Z¨ urich, 2008

work page 2008

[15] [15]

Novak, H

E. Novak, H. W o´ zniakowski, Tractablity of Multivaria te Problems, Volume II: Standard In- formation for Functionals, EMS, Z¨ urich, 2010

work page 2010

[16] [16]

Novak, H

E. Novak, H. W o´ zniakowski, Tractablity of Multivaria te Problems, Volume III: Standard Information for Operators, EMS, Z¨ urich, 2012

work page 2012

[17] [17]

Papageorgiou, I

A. Papageorgiou, I. Petras, A new criterion for tractab ility of multivariate problems, J. Complexity 30 (2014) 604-619

work page 2014

[18] [18]

Pietsch, Operator Ideals, North-Holland, Amsterda m, 1980

A. Pietsch, Operator Ideals, North-Holland, Amsterda m, 1980

work page 1980

[19] [19]

Pietsch, Eigenvalues and s-Numbers, Cambridge Univ ersity Press, Cambridge, 1987

A. Pietsch, Eigenvalues and s-Numbers, Cambridge Univ ersity Press, Cambridge, 1987

work page 1987

[20] [20]

Pinkus, n-Widths in Approximation Theory, Ergeb

A. Pinkus, n-Widths in Approximation Theory, Ergeb. Ma th. Grenzgeb., vol. 3.7, Springer, Berlin, 1985

work page 1985

[21] [21]

Xu, Exponential convergence-tractability of gener al linear problems in the average case setting, J

G. Xu, Exponential convergence-tractability of gener al linear problems in the average case setting, J. Complexity 31 (2015) 617-636. 20

work page 2015

[22] [22]

A note about EC-$(s,t)$-weak tractability of multivariate approximation with analytic Korobov kernels

H. W ang, A note about EC-( s, t)-weak tractability of multivariate approximation with an a- lytic Korobov kernels, to appear in J. Complexity. Also see h ttp://arxiv.org/abs/1808.01470

work page internal anchor Pith review Pith/arXiv arXiv

[23] [23]

W ang, Volumes of generalized unit balls, Math.Mag

X. W ang, Volumes of generalized unit balls, Math.Mag. 7 8 (5) (2005) 390-395

work page 2005

[24] [24]

W erschulz, H

A. W erschulz, H. W o´ zniakowski, Tractability of multi variate approximation over weighted standard Sobolev spaces, J. Complexity, in press (2018). School of Mathematical Sciences, BCMIIS, Capital Normal Univ ersity, Beijing 100048, China. E-mail address : 1047695025@qq.com(D. Hao). wanghp@cnu.edu.cn(H. Wang)

work page 2018