The essential numerical range for unbounded linear operators

Christiane Tretter; Marco Marletta; Sabine B\"ogli

arxiv: 1907.09599 · v1 · pith:MS5V4J72new · submitted 2019-07-22 · 🧮 math.SP · math.AP· math.FA

The essential numerical range for unbounded linear operators

Sabine B\"ogli , Marco Marletta , Christiane Tretter This is my paper

Pith reviewed 2026-05-24 17:19 UTC · model grok-4.3

classification 🧮 math.SP math.APmath.FA

keywords essential numerical rangeunbounded operatorsspectral pollutionprojection methodsdomain truncationHilbert space operatorsperturbation resultsnumerical range

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The pith

The essential numerical range We(T) for unbounded operators captures spectral pollution from approximations in a unified minimal way.

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

The paper defines the essential numerical range We(T) for unbounded operators on Hilbert space and investigates its basic properties along with equivalent characterizations and perturbation behavior. Many properties that hold when T is bounded fail in the unbounded setting, and the authors exhibit new phenomena through examples. The central claim is that this We(T) serves as a minimal object that contains all spectral pollution arising when T is approximated by projection methods or by domain truncation, which is relevant for numerical solution of PDEs.

Core claim

We introduce the concept of essential numerical range We(T) for unbounded Hilbert space operators T and study its fundamental properties including possible equivalent characterizations and perturbation results. Many of the properties known for the bounded case do not carry over to the unbounded case, and new interesting phenomena arise which we illustrate by some striking examples. A key feature of the essential numerical range We(T) is that it captures spectral pollution in a unified and minimal way when approximating T by projection methods or domain truncation methods for PDEs.

What carries the argument

The essential numerical range We(T) for an unbounded operator T, defined to remain a minimal detector of spectral pollution under approximation.

If this is right

Spectra obtained from projection or truncation approximations of T lie in the numerical range of T plus the set We(T).
If We(T) is empty or small, certain approximation methods are guaranteed to produce no spectral pollution outside the true spectrum.
Perturbation theorems for We(T) give stability of the polluted set under small changes to the operator.
Equivalent characterizations allow computation or bounding of We(T) without direct reference to approximating sequences.

Where Pith is reading between the lines

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

The same minimal-set idea could be tested on other approximation families such as finite-element or spectral methods for the same operators.
Operators arising from differential expressions on unbounded domains would form natural test cases for whether We(T) stays small.
If We(T) coincides with the usual essential spectrum in many cases, the range might simplify existing pollution criteria for self-adjoint problems.
Numerical experiments that compute We(T) explicitly for concrete PDE operators would make the abstract definition directly usable.

Load-bearing premise

The definition of We(T) is selected so that the set remains a useful minimal container for polluted spectra even though standard bounded-case properties no longer hold.

What would settle it

An explicit unbounded operator T together with a sequence of projections or truncations whose polluted eigenvalues lie outside We(T) would show that the range fails to capture spectral pollution.

Figures

Figures reproduced from arXiv: 1907.09599 by Christiane Tretter, Marco Marletta, Sabine B\"ogli.

**Figure 2.** Figure 2: Eigenvalues in the interval [−5, 10] of An with Q1(x) = −2, Q0(x) = 20 sin(x)e−x 2 truncated to [−sn, sn] for different values of sn. Our result (7.16) shows, first, that all accumulation points in [0, ∞) may be spurious and, secondly, that the accumulation point λ ≈ −3.25 which does not belong to We(A) is not a spurious but a true eigenvalue, i.e. λ ∈ σ(A), see also [PITH_FULL_IMAGE:figures/full_fig_p03… view at source ↗

read the original abstract

We introduce the concept of essential numerical range $W_{\!e}(T)$ for unbounded Hilbert space operators $T$ and study its fundamental properties including possible equivalent characterizations and perturbation results. Many of the properties known for the bounded case do \emph{not} carry over to the unbounded case, and new interesting phenomena arise which we illustrate by some striking examples. A key feature of the essential numerical range $W_{\!e}(T)$ is that it captures spectral pollution in a unified and minimal way when approximating $T$ by projection methods or domain truncation methods for PDEs.

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 defines the essential numerical range for unbounded operators so that it tracks spectral pollution in approximations even when bounded-case facts fail.

read the letter

The main thing here is a workable extension of the essential numerical range to unbounded Hilbert-space operators. The definition uses an intersection over compact perturbations adapted to the unbounded setting, and the authors show it remains minimal for catching spectral pollution in projection methods and domain truncations for PDEs. They also give equivalent characterizations, including one through the numerical range of the resolvent, plus perturbation stability results, and they exhibit concrete cases where polluted spectrum sits inside We(T) but outside the essential spectrum. Several bounded-case identities break, and they document the new phenomena with examples rather than just noting the failures. The formal side looks clean: explicit definition, derivations, and falsifiable checks in the examples. No load-bearing fitting or self-reference is visible. The choice of definition is justified by how it performs on the pollution task, which is the stated goal. Minor soft spots exist around whether alternative definitions could serve equally well, but the paper does not overclaim uniqueness and the examples support the current choice. This is aimed at people working on numerical spectral theory for unbounded operators arising in differential equations. A reader who needs a single object to organize approximation errors across methods will get direct value from the characterizations and the examples. It deserves a serious referee because the contribution is focused, the supporting constructions are explicit, and the application to PDE approximations is concrete. I would send it to peer review.

Referee Report

0 major / 3 minor

Summary. The manuscript defines the essential numerical range We(T) for unbounded Hilbert-space operators T via the intersection of numerical ranges over compact perturbations (adapted to the unbounded setting). It derives several equivalent characterizations, including one via the numerical range of the resolvent, proves perturbation-stability results, and supplies concrete examples of projection and domain-truncation approximations in which the polluted spectrum lies inside We(T) but outside the essential spectrum. The paper notes that many bounded-case identities fail to hold and illustrates new phenomena with striking examples.

Significance. If the definition and characterizations hold, the work supplies a minimal, unified object for detecting spectral pollution in numerical approximations of unbounded operators arising in PDEs. The explicit definition, resolvent characterization, stability theorems, and concrete examples directly support the claim of minimality even when standard bounded-case properties are absent.

minor comments (3)

[§2] §2 (definition): the precise domain considerations in the compact-perturbation intersection should be stated explicitly to avoid ambiguity when T is only densely defined.
[final section] The examples in the final section would benefit from a short table summarizing which bounded-case identities fail and which new phenomena appear.
Notation: the subscript spacing in W_e(T) is non-standard; ensure it is rendered consistently in all equations and text.

Simulated Author's Rebuttal

0 responses · 0 unresolved

We thank the referee for the positive summary, significance assessment, and recommendation of minor revision. No major comments appear in the report.

Circularity Check

0 steps flagged

No significant circularity detected

full rationale

The paper introduces a new definition of the essential numerical range We(T) for unbounded operators via intersection over compact perturbations (adapted to the unbounded setting) and derives equivalent characterizations, perturbation stability, and examples of spectral pollution detection directly from this definition. No steps reduce claims to fitted parameters, self-referential equations, or load-bearing self-citations; the central contribution is the definition and its independent verification through theorems and concrete approximation examples, making the derivation self-contained.

Axiom & Free-Parameter Ledger

0 free parameters · 1 axioms · 1 invented entities

The paper introduces a new definition within standard functional analysis; no free parameters, ad-hoc axioms, or invented physical entities are required beyond the definition itself.

axioms (1)

standard math Standard properties of densely defined unbounded linear operators on Hilbert spaces
The work is set in the usual framework of unbounded operators; this background is invoked implicitly throughout the abstract.

invented entities (1)

essential numerical range We(T) no independent evidence
purpose: To capture spectral pollution in a unified minimal way for unbounded operators under projection and truncation approximations
This is the central new object defined by the paper.

pith-pipeline@v0.9.0 · 5621 in / 1195 out tokens · 26054 ms · 2026-05-24T17:19:57.470397+00:00 · methodology

discussion (0)

Reference graph

Works this paper leans on

42 extracted references · 42 canonical work pages · 1 internal anchor

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Numerical problems associated with the presence of continuous spectra

Appert, K., Balet, B., Gruber, R., Troyon, F., and Vaclavik, J. Numerical problems associated with the presence of continuous spectra. Comput. Phys. Comm. 24 , 3-4 (1981), 329–335

work page 1981

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Preprint, 2018

Arlinskii, Z., and Tretter, C. . Preprint, 2018

work page 2018

[3] [3]

B., Everitt, W

Bailey, P. B., Everitt, W. N., Weidmann, J., and Zettl, A. Regular approximations of singular Sturm-Liouville problems. Results Math. 23 , 1-2 (1993), 3–22

work page 1993

[4] [4]

D., and Mishev, D

Ba˘ınov, D. D., and Mishev, D. P. Oscillation theory for neutral diﬀerential equations with delay. Adam Hilger, Ltd., Bristol, 1991

work page 1991

[5] [5]

Local convergence of spectra and pseudospectra

B¨ogli, S. Local convergence of spectra and pseudospectra. Accepted for publication in J. Spectr. Theory. arXiv:1605.01041 [math.SP], 2016

work page internal anchor Pith review Pith/arXiv arXiv 2016

[6] [6]

Convergence of Sequences of Linear Operators and Their Spectra

B¨ogli, S. Convergence of Sequences of Linear Operators and Their Spectra. Integral Equa- tions and Operator Theory 88 , 4 (2017), 559–599. THE ESSENTIAL NUMERICAL RANGE FOR UNBOUNDED LINEAR OPERATORS 35

work page 2017

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Approximations of spectra of Schr¨ odinger operators with complex potentials on Rd

B¨ogli, S., Siegl, P., and Tretter, C. Approximations of spectra of Schr¨ odinger operators with complex potentials on Rd. Comm. Part. Diﬀ. Eq. 42 , 7 (2017), 1001–1041

work page 2017

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Generalised Weyl theorems and spectral pollu- tion in the Galerkin method

Boulton, L., Boussa¨ıd, N., and Lewin, M. Generalised Weyl theorems and spectral pollu- tion in the Galerkin method. J. Spectr. Theory 2 , 4 (2012), 329–354

work page 2012

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M., McCormack, D

Brown, B. M., McCormack, D. K. R., Evans, W. D., and Plum, M. On the spectrum of second-order diﬀerential operators with complex coeﬃcients. R. Soc. Lond. Proc. Ser. A Math. Phys. Eng. Sci. 455 , 1984 (1999), 1235–1257

work page 1984

[10] [10]

Periodic Schr¨ odinger operators with local defects and spectral pollution

Canc`es, E., Ehrlacher, V., and Maday, Y. Periodic Schr¨ odinger operators with local defects and spectral pollution. SIAM J. Numer. Anal. 50 , 6 (2012), 3016–3035

work page 2012

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Numerical approximation of the spectra of non-compact operators arising in buckling problems

Dauge, M., and Suri, M. Numerical approximation of the spectra of non-compact operators arising in buckling problems. J. Numer. Math. 10 , 3 (2002), 193–219

work page 2002

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On the asymptotic behaviour of the discrete spectrum in buckling problems for thin plates

Dauge, M., and Suri, M. On the asymptotic behaviour of the discrete spectrum in buckling problems for thin plates. Math. Methods Appl. Sci. 29 , 7 (2006), 789–817

work page 2006

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Davies, E. B. Pseudospectra of diﬀerential operators. J. Operator Theory 43, 2 (2000), 243– 262

work page 2000

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B., and Plum, M.Spectral pollution

Davies, E. B., and Plum, M.Spectral pollution. IMA J. Numer. Anal. 24, 3 (2004), 417–438

work page 2004

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Essential numerical range of an operator with respect to a coercive form and the approximation of its spectrum by the Galerkin method

Descloux, J. Essential numerical range of an operator with respect to a coercive form and the approximation of its spectrum by the Galerkin method. SIAM J. Numer. Anal. 18 , 6 (1981), 1128–1133

work page 1981

[16] [16]

E., and Evans, W

Edmunds, D. E., and Evans, W. D. Spectral theory and diﬀerential operators. Oxford Uni- versity Press, New York, 1987

work page 1987

[17] [17]

A., Stampfli, J

Fillmore, P. A., Stampfli, J. G., and Williams, J. P. On the essential numerical range, the essential spectrum, and a problem of Halmos. Acta Sci. Math. (Szeged) 33 (1972), 179– 192

work page 1972

[18] [18]

Generalized polar decom- positions for closed operators in Hilbert spaces and some applications

Gesztesy, F., Malamud, M., Mitrea, M., and Naboko, S. Generalized polar decom- positions for closed operators in Hilbert spaces and some applications. Integral Equations Operator Theory 64, 1 (2009), 83–113

work page 2009

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C., and Kre˘ın, M

Gohberg, I. C., and Kre˘ın, M. G. The basic propositions on defect numbers, root numbers and indices of linear operators. Amer. Math. Soc. Transl. (2) 13 (1960), 185–264

work page 1960

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Unbounded linear operators: Theory and applications

Goldberg, S. Unbounded linear operators: Theory and applications. McGraw-Hill Book Co., New York-Toronto, Ont.-London, 1966

work page 1966

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Spectral mapping theorems for essential spectra

Gramsch, B., and Lay, D. Spectral mapping theorems for essential spectra. Math. Ann. 192 (1971), 17–32

work page 1971

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Finite element methods in linear ideal magnetohydrodynamics

Gruber, R., and Rappaz, J. Finite element methods in linear ideal magnetohydrodynamics. Springer Series in Computational Physics. Springer-Verlag, Berlin, 1985

work page 1985

[23] [23]

On pseudo-spectral problems related to a time-dependent model in supercon- ductivity with electric current

Helffer, B. On pseudo-spectral problems related to a time-dependent model in supercon- ductivity with electric current. Conﬂuentes Math. 3 , 2 (2011), 237–251

work page 2011

[24] [24]

Remark on the relation between spectral pollution and inf-sup condition

Kako, T. Remark on the relation between spectral pollution and inf-sup condition. In Recent developments in domain decomposition methods and ﬂow problems (Kyoto, 1996; Anacapri, 1996), vol. 11 of GAKUTO Internat. Ser. Math. Sci. Appl. Gakk¯ otosho, Tokyo, 1998, pp. 252–258

work page 1996

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Fractional powers of dissipative operators.J

Kato, T. Fractional powers of dissipative operators.J. Math. Soc. Japan 13 (1961), 246–274

work page 1961

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Perturbation theory for linear operators

Kato, T. Perturbation theory for linear operators . Springer-Verlag, Berlin, 1995. Reprint of the 1980 edition

work page 1995

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Generalizations of Compact Operators in Locally Convex Topological Linear Spaces

Lacey, E. Generalizations of Compact Operators in Locally Convex Topological Linear Spaces. PhD thesis, New Mexico State University, 1963

work page 1963

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E., and Lewis, J

Leonard, I. E., and Lewis, J. E. Geometry of convex sets . John Wiley & Sons, Inc., Hobo- ken, NJ, 2016

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Spectral pollution and second-order relative spectra for self-adjoint operators

Levitin, M., and Shargorodsky, E. Spectral pollution and second-order relative spectra for self-adjoint operators. IMA J. Numer. Anal. 24 , 3 (2004), 393–416

work page 2004

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Spectral pollution and how to avoid it (with applications to Dirac and periodic Schr¨ odinger operators).Proc

Lewin, M., and S´er´e, ´E. Spectral pollution and how to avoid it (with applications to Dirac and periodic Schr¨ odinger operators).Proc. Lond. Math. Soc. (3) 100, 3 (2010), 864–900

work page 2010

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Neumann-Dirichlet maps and analysis of spectral pollution for non-self-adjoint elliptic PDEs with real essential spectrum

Marletta, M. Neumann-Dirichlet maps and analysis of spectral pollution for non-self-adjoint elliptic PDEs with real essential spectrum. IMA J. Numer. Anal. 30 , 4 (2010), 917–939

work page 2010

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Method of orthogonal projections and approximation of the spectrum of a bounded operator

Pokrzywa, A. Method of orthogonal projections and approximation of the spectrum of a bounded operator. Studia Math. 65 , 1 (1979), 21–29

work page 1979

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Method of orthogonal projections and approximation of the spectrum of a bounded operator

Pokrzywa, A. Method of orthogonal projections and approximation of the spectrum of a bounded operator. II. Studia Math. 70 , 1 (1981), 1–9

work page 1981

[34] [34]

Rademacher, J. D. M., Sandstede, B., and Scheel, A. Computing absolute and essential spectra using continuation. Phys. D 229 , 2 (2007), 166–183

work page 2007

[35] [35]

Spectral pollution of a noncompact operator

Rappaz, J. Spectral pollution of a noncompact operator. Comput. Phys. Comm. 24 , 3-4 (1981), 323–327. 36 SABINE B ¨OGLI, MARCO MARLETTA, AND CHRISTIANE TRETTER

work page 1981

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T., and Wets, R

Rockafellar, R. T., and Wets, R. J.-B. Variational analysis, vol. 317 of Grundlehren der Mathematischen Wissenschaften [Fundamental Principles of Mathematical Sciences] . Springer-Verlag, Berlin, 1998

work page 1998

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Operators with essentially disconnected spectrum

Salinas, N. Operators with essentially disconnected spectrum. Acta Sci. Math. (Szeged) 33 (1972), 193–205

work page 1972

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Absolute and convective instabilities of waves on unbounded and large bounded domains

Sandstede, B., and Scheel, A. Absolute and convective instabilities of waves on unbounded and large bounded domains. Phys. D 145 , 3-4 (2000), 233–277

work page 2000

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Spectra of partial diﬀerential operators, second ed., vol

Schechter, M. Spectra of partial diﬀerential operators, second ed., vol. 14 of North-Holland Series in Applied Mathematics and Mechanics . North-Holland Publishing Co., Amsterdam, 1986

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