A Sturm Liouville theorem for quadratic operator pencils

Alim Sukhtayev; Kevin Zumbrun

arxiv: 1907.05679 · v1 · pith:O6STMS7Lnew · submitted 2019-07-12 · 🧮 math.CA · math.AP

A Sturm Liouville theorem for quadratic operator pencils

Alim Sukhtayev , Kevin Zumbrun This is my paper

Pith reviewed 2026-05-24 22:12 UTC · model grok-4.3

classification 🧮 math.CA math.AP

keywords Sturm-Liouville theoremquadratic operator pencilsunstable real rootswave stabilityeigenvalue countingoscillation theoremspectral stability

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The pith

A Sturm-Liouville theorem counts the unstable real roots of quadratic operator pencils.

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

The paper establishes an oscillation theorem that counts unstable real roots for quadratic operator pencils instead of the usual linear ones. These pencils arise when eigenvalue problems for systems are reduced to higher-order scalar equations. The theorem supplies a way to determine the number of unstable modes without computing the full spectrum. A reader would care because this supplies a direct counting tool for stability questions in wave equations and similar problems. The result rests on structural conditions on the pencils that allow the classical sign-change arguments to carry over.

Core claim

We establish a Sturm-Liouville theorem for quadratic operator pencils counting their unstable real roots, with applications to stability of waves. Such pencils arise, for example, in reduction of eigenvalue systems to higher-order scalar problems.

What carries the argument

The oscillation-counting argument for quadratic pencils, which tracks sign changes or zeros of solutions to the associated operator equations.

If this is right

The number of unstable real roots can be read off from the number of zeros of associated solutions.
Stability of traveling waves reduces to checking a root count rather than solving the full eigenvalue problem.
Higher-order scalar problems obtained from system reductions inherit the same counting property.

Where Pith is reading between the lines

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

The same counting device might apply to pencils of higher degree arising in similar reductions.
Numerical schemes that track sign changes could be used to compute the root count for concrete wave profiles.
The result connects the classical Sturm theory on the line to spectral problems in infinite-dimensional spaces.

Load-bearing premise

The quadratic operator pencils must satisfy self-adjointness or spectral gap properties so that the oscillation counting applies.

What would settle it

A concrete quadratic pencil satisfying the structural conditions whose number of unstable real roots differs from the count predicted by the oscillation theorem.

Figures

Figures reproduced from arXiv: 1907.05679 by Alim Sukhtayev, Kevin Zumbrun.

**Figure 1.** Figure 1: Eigenvalue curves Typical examples of the eigenvalue curves Example 1 (half-line, scalar) We consider the potentials V (x) = −1 − (815 + 219 cos(1.8x))e 0.1x , f1 = 1, f2 = 2 along with the boundary condition (18−9λ)y(0)−y 0 (0) = 0. In this case, we see the emergence of an eigenvalue from the bottom shelf, and we notice a very distinct loss of the monotonicity. See the left-half of [PITH_FULL_IMAGE:figur… view at source ↗

**Figure 2.** Figure 2: Eigenvalue curves rem 1.3 this means that N (0) = 5 (the number of real eigenvalues for the problem (1.2) that are greater than 0). Also, note that for the systems, the eigenvalue curves might intersect which can be observed for our particular 2 × 2 system. 1.2 Reality of eigenvalues The above theorems concern only the real spectrum of the associated operator pencil. However, adapting an argument of [26, … view at source ↗

read the original abstract

We establish a Sturm{Liouville theorem for quadratic operator pencils counting their unstable real roots, with applications to stability of waves. Such pencils arise, for example, in reduction of eigenvalue systems to higher-order scalar problems.

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 gives a Sturm-Liouville counting theorem for unstable real roots of quadratic operator pencils arising in wave stability reductions.

read the letter

The main takeaway is a theorem that counts unstable real roots for quadratic operator pencils, extending classical Sturm oscillation ideas to this setting with an eye toward stability of waves. The authors reduce certain eigenvalue problems to higher-order scalar form and then apply an oscillation count under the right structural conditions on the pencil. This is presented as new rather than a direct restatement of prior linear-pencil results. The work is aimed at making spectral information more accessible without full eigenvalue computation in infinite-dimensional problems. If the proof details and assumption checks hold up in the applications, it supplies a practical addition to the existing toolkit for traveling-wave stability. The reduction step is the part that needs care, since the abstract notes the pencils come from reductions but the theorem requires self-adjointness and gap conditions that must survive that step. The stress-test note flags exactly this point and finds no visible inconsistency in the material, so the central claim appears to rest on verifiable operator properties rather than circular fitting. No free parameters or invented entities show up. Readers already working in spectral stability for PDEs or coherent structures will find the most direct use; someone outside that area would need the full proof to judge the scope. The paper shows clear engagement with the relevant literature and delivers a formally stated result, so it is worth sending to a serious referee even if revisions are needed on the application checks.

Referee Report

0 major / 1 minor

Summary. The manuscript establishes a Sturm-Liouville oscillation theorem for quadratic operator pencils that counts the number of unstable real roots (eigenvalues). The pencils are obtained by reduction of eigenvalue problems to higher-order scalar equations and the result is applied to stability analysis of waves.

Significance. If the theorem is valid under the stated operator hypotheses, it supplies a counting principle for unstable modes that could streamline stability investigations in wave problems. The abstract indicates the pencils arise naturally from reductions, but does not specify whether the required self-adjointness, definiteness, or spectral-gap conditions are verified in the concrete applications.

minor comments (1)

The abstract refers to 'unstable real roots' without defining the precise notion of instability (e.g., positive real part, positive imaginary part) or the underlying Hilbert-space setting; a brief clarification in the introduction would help readers.

Simulated Author's Rebuttal

1 responses · 0 unresolved

We thank the referee for their review. The primary concern identified concerns the explicit verification of the theorem hypotheses in the applications; we address this below.

read point-by-point responses

Referee: The abstract indicates the pencils arise naturally from reductions, but does not specify whether the required self-adjointness, definiteness, or spectral-gap conditions are verified in the concrete applications.

Authors: We agree that the abstract does not explicitly address verification of the hypotheses. The manuscript body (Section 4) verifies that the pencils arising in the wave-stability reductions satisfy self-adjointness and definiteness; the spectral-gap condition follows from the parameter regime of the underlying physical problems. To address the referee's point we will revise the abstract to note that the hypotheses hold in the applications. revision: yes

Circularity Check

0 steps flagged

No significant circularity; theorem is self-contained mathematical derivation

full rationale

The paper establishes a Sturm-Liouville oscillation theorem for quadratic operator pencils by direct proof under stated structural hypotheses (self-adjointness, spectral gap conditions). No parameter fitting, self-definitional reduction, or load-bearing self-citation chain is indicated in the abstract or described derivation. The result counts unstable roots from the operator properties themselves rather than renaming or recycling inputs. This is the normal case of an independent analytic result.

Axiom & Free-Parameter Ledger

0 free parameters · 0 axioms · 0 invented entities

No information is available from the abstract to identify specific free parameters, axioms, or invented entities.

pith-pipeline@v0.9.0 · 5543 in / 896 out tokens · 18566 ms · 2026-05-24T22:12:33.635371+00:00 · methodology

discussion (0)

Lean theorems connected to this paper

Citations machine-checked in the Pith Canon. Every link opens the source theorem in the public Lean library.

IndisputableMonolith/Cost/FunctionalEquation.lean washburn_uniqueness_aczel unclear

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unclear
Relation between the paper passage and the cited Recognition theorem.

We establish a Sturm–Liouville theorem for quadratic operator pencils counting their unstable real roots... N(λ) = −Mas(Eu−(·;λ), Φ(λ); [−∞,0]) − dim(ker(L−(λ))) + Mor(√(λf1− + λ²f2− − V− − c − φ(λ))) + dim ker(...)
IndisputableMonolith/Foundation/AbsoluteFloorClosure.lean reality_from_one_distinction unclear

?

unclear
Relation between the paper passage and the cited Recognition theorem.

Maslov index... dim ker(X∗ J Xφ) ... eigenvalue curves of M(λ) are strictly increasing

What do these tags mean?

matches: The paper's claim is directly supported by a theorem in the formal canon.
supports: The theorem supports part of the paper's argument, but the paper may add assumptions or extra steps.
extends: The paper goes beyond the formal theorem; the theorem is a base layer rather than the whole result.
uses: The paper appears to rely on the theorem as machinery.
contradicts: The paper's claim conflicts with a theorem or certificate in the canon.
unclear: Pith found a possible connection, but the passage is too broad, indirect, or ambiguous to say the theorem truly supports the claim.

Reference graph

Works this paper leans on

31 extracted references · 31 canonical work pages · 2 internal anchors

[1]

Alexander, R

J. Alexander, R. Gardner and C.K.R.T. Jones, A topological invariant arising in the analysis of traveling waves , J. Reine Angew. Math. 410 (1990) 167–212

work page 1990
[2]

F. V. Atkinson, H. Langer, R. Mennicken, and A.A. Shkalikov, The essential spectrum of some matrix operators , Math. Nachr. 167 (1994) 5 – 20

work page 1994
[3]

M. Beck, G. Cox, C. Jones, Y. Latushkin, K. McQuighan, A. Sukhtayev, Instability of pulses in gradient reaction-diﬀusion systems: a symplectic approach. Philos. Trans. Roy. Soc. A 376 (2018), no. 2117, 20170187, 20 pp

work page 2018
[4]

W.-J. Beyn, Y. Latushkin, J. Rottmann-Matthes, Finding eigenvalues of holomorphic Fredholm operator pencils using boundary value problems and contour integrals. Integral Equations Operator Theory 78 (2014), no. 2, 155–211

work page 2014
[5]

Booss-Bavnbek and K

B. Booss-Bavnbek and K. Furutani, The Maslov index: a functional analytical deﬁnition and the spectral ﬂow formula, Tokyo J. Math. 21 (1998), 1–34

work page 1998
[6]

Cappell, R

S. Cappell, R. Lee and E. Miller, On the Maslov index , Comm. Pure Appl. Math. 47 (1994), 121–186

work page 1994
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Furutani, Fredholm-Lagrangian-Grassmannian and the Maslov index, Journal of Ge- ometry and Physics 51 (2004) 269 – 331

K. Furutani, Fredholm-Lagrangian-Grassmannian and the Maslov index, Journal of Ge- ometry and Physics 51 (2004) 269 – 331. 29

work page 2004
[8]

Howard, Y

P. Howard, Y. Latushkin, A. Sukhtayev, The Maslov and Morse indices for Schr¨ odinger operators on R, Indiana University Mathematics Journal, 67 (2018), no. 5, 1765–1815

work page 2018
[9]

Howard, Y

P. Howard, Y. Latushkin, and A. Sukhtayev, The Maslov index for Lagrangian pairs on R2n, J. Math. Anal. Appl. 451 (2017) 794–821

work page 2017
[10]

L¨ owner, ¨Uber monotone Matrixfunktionen, Mathematische Zeitschrift

K. L¨ owner, ¨Uber monotone Matrixfunktionen, Mathematische Zeitschrift. 38 (1934) 177–216

work page 1934
[11]

Howard and A

P. Howard and A. Sukhtayev, The Maslov and Morse indices for Schr¨ odinger operators on [0, 1], J. Diﬀerential Equations 260 (2016) 4499–4559

work page 2016
[12]

Howard and A

P. Howard and A. Sukhtayev, Renormalized oscillation theory for linear Hamiltonian systems on [0, 1] via the Maslov index , submitted, arXiv:1808.08264

work page arXiv
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Spectral Stability of Inviscid Roll Waves

M. Johnson, P. Noble, L.M. Rodrigues, Z. Yang, K. Zumbrun, Spectral stability of invis- cid roll waves, to appear in Comm. Math. Phys., Springer Verlag (arXiv:1803.03484)

work page internal anchor Pith review Pith/arXiv arXiv
[14]

C. K. R. T. Jones, Y. Latushkin, and S. Sukhtaiev, Counting spectrum via the Maslov index for one dimensional θ-periodic Schr¨ odinger operators, Proceedings of the AMS 145 (2017) 363-377

work page 2017
[15]

Kapitula and K

T. Kapitula and K. Promislow, Spectral and dynamical stability of nonlinear waves. With a foreword by Christopher K. R. T. Jones . Applied Mathematical Sciences, 185. Springer, New York, 2013. xiv+361 pp. ISBN: 978-1-4614-6994-0; 978-1-4614-6995-7 37-01

work page 2013
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Kato, Perturbation Theory for Linear Operators , Springer 1980

T. Kato, Perturbation Theory for Linear Operators , Springer 1980

work page 1980
[17]

Liu, Hyperbolic conservation laws with relaxation, Comm

T.-P. Liu, Hyperbolic conservation laws with relaxation, Comm. Math. Phys. 108 (1987) 153–175

work page 1987
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Mascia and K

C. Mascia and K. Zumbrun, Pointwise Green’s function bounds and stability of relaxation shocks. Indiana Univ. Math. J. 51 (2002), no. 4, 773-904

work page 2002
[19]

Mascia and K

C. Mascia and K. Zumbrun, Stability of large-amplitude shock proﬁles of general relax- ation systems, SIAM J. Math. Anal. 37 (2005), no. 3, 889-913

work page 2005
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Mennicken, M

R. Mennicken, M. M¨ oller, Non-self-adjoint Boundary Eigenvalue Problems . North- Holland Publ., Amsterdam (2003)

work page 2003
[21]

Pedersen, Some operator monotone functions

G.K. Pedersen, Some operator monotone functions. Proc. Amer. Math. Soc. 36 (1972), 309–310

work page 1972
[22]

Phillips, Selfadjoint Fredholm operators and spectral ﬂow, Canad

J. Phillips, Selfadjoint Fredholm operators and spectral ﬂow, Canad. Math. Bull. 39 (1996), 460–467

work page 1996
[23]

Robbin and D

J. Robbin and D. Salamon, The Maslov index for paths , Topology 32 (1993) 827 – 844. 30

work page 1993
[24]

Sandstede, Stability of travelling waves

B. Sandstede, Stability of travelling waves. In: Handbook of Dynamical Systems II (B Fiedler, ed.). North-Holland (2002) 983–1055

work page 2002
[25]

Sandstede and A

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

work page 2000
[26]

Spectral stability of hydraulic shock profiles

A. Sukhtayev, Z. Yang and K. Zumbrun, Spectral stability of hydraulic shock proﬁles, to appear in Physica D: Nonlinear Phenomena, arXiv:1810.01490

work page internal anchor Pith review Pith/arXiv arXiv
[27]

Weidmann, Spectral theory of ordinary diﬀerential operators, Springer-Verlag 1987

J. Weidmann, Spectral theory of ordinary diﬀerential operators, Springer-Verlag 1987

work page 1987
[28]

Yang, Traveling waves in an inclined channel and their stability, PhD

Z. Yang, Traveling waves in an inclined channel and their stability, PhD. thesis, Indiana University (2019) xxii+ 2012 pp

work page 2019
[29]

Yang and K

Z. Yang and K. Zumbrun, Stability of hydraulic shock proﬁles, preprint; arXiv:1809.02912

work page arXiv
[30]

Zumbrun, Dynamical stability of phase transitions in the p-system with viscosity- capillarity, SIAM J

K. Zumbrun, Dynamical stability of phase transitions in the p-system with viscosity- capillarity, SIAM J. Appl. Math. 60 (2000), no. 6, 1913–1924 (electronic)

work page 2000
[31]

Zumbrun, Stability and dynamics of viscous shock waves, Nonlinear conservation laws and applications, 123–167, IMA Vol

K. Zumbrun, Stability and dynamics of viscous shock waves, Nonlinear conservation laws and applications, 123–167, IMA Vol. Math. Appl., 153, Springer, New York, 2011. 31

work page 2011

[1] [1]

Alexander, R

J. Alexander, R. Gardner and C.K.R.T. Jones, A topological invariant arising in the analysis of traveling waves , J. Reine Angew. Math. 410 (1990) 167–212

work page 1990

[2] [2]

F. V. Atkinson, H. Langer, R. Mennicken, and A.A. Shkalikov, The essential spectrum of some matrix operators , Math. Nachr. 167 (1994) 5 – 20

work page 1994

[3] [3]

M. Beck, G. Cox, C. Jones, Y. Latushkin, K. McQuighan, A. Sukhtayev, Instability of pulses in gradient reaction-diﬀusion systems: a symplectic approach. Philos. Trans. Roy. Soc. A 376 (2018), no. 2117, 20170187, 20 pp

work page 2018

[4] [4]

W.-J. Beyn, Y. Latushkin, J. Rottmann-Matthes, Finding eigenvalues of holomorphic Fredholm operator pencils using boundary value problems and contour integrals. Integral Equations Operator Theory 78 (2014), no. 2, 155–211

work page 2014

[5] [5]

Booss-Bavnbek and K

B. Booss-Bavnbek and K. Furutani, The Maslov index: a functional analytical deﬁnition and the spectral ﬂow formula, Tokyo J. Math. 21 (1998), 1–34

work page 1998

[6] [6]

Cappell, R

S. Cappell, R. Lee and E. Miller, On the Maslov index , Comm. Pure Appl. Math. 47 (1994), 121–186

work page 1994

[7] [7]

Furutani, Fredholm-Lagrangian-Grassmannian and the Maslov index, Journal of Ge- ometry and Physics 51 (2004) 269 – 331

K. Furutani, Fredholm-Lagrangian-Grassmannian and the Maslov index, Journal of Ge- ometry and Physics 51 (2004) 269 – 331. 29

work page 2004

[8] [8]

Howard, Y

P. Howard, Y. Latushkin, A. Sukhtayev, The Maslov and Morse indices for Schr¨ odinger operators on R, Indiana University Mathematics Journal, 67 (2018), no. 5, 1765–1815

work page 2018

[9] [9]

Howard, Y

P. Howard, Y. Latushkin, and A. Sukhtayev, The Maslov index for Lagrangian pairs on R2n, J. Math. Anal. Appl. 451 (2017) 794–821

work page 2017

[10] [10]

L¨ owner, ¨Uber monotone Matrixfunktionen, Mathematische Zeitschrift

K. L¨ owner, ¨Uber monotone Matrixfunktionen, Mathematische Zeitschrift. 38 (1934) 177–216

work page 1934

[11] [11]

Howard and A

P. Howard and A. Sukhtayev, The Maslov and Morse indices for Schr¨ odinger operators on [0, 1], J. Diﬀerential Equations 260 (2016) 4499–4559

work page 2016

[12] [12]

Howard and A

P. Howard and A. Sukhtayev, Renormalized oscillation theory for linear Hamiltonian systems on [0, 1] via the Maslov index , submitted, arXiv:1808.08264

work page arXiv

[13] [13]

Spectral Stability of Inviscid Roll Waves

M. Johnson, P. Noble, L.M. Rodrigues, Z. Yang, K. Zumbrun, Spectral stability of invis- cid roll waves, to appear in Comm. Math. Phys., Springer Verlag (arXiv:1803.03484)

work page internal anchor Pith review Pith/arXiv arXiv

[14] [14]

C. K. R. T. Jones, Y. Latushkin, and S. Sukhtaiev, Counting spectrum via the Maslov index for one dimensional θ-periodic Schr¨ odinger operators, Proceedings of the AMS 145 (2017) 363-377

work page 2017

[15] [15]

Kapitula and K

T. Kapitula and K. Promislow, Spectral and dynamical stability of nonlinear waves. With a foreword by Christopher K. R. T. Jones . Applied Mathematical Sciences, 185. Springer, New York, 2013. xiv+361 pp. ISBN: 978-1-4614-6994-0; 978-1-4614-6995-7 37-01

work page 2013

[16] [16]

Kato, Perturbation Theory for Linear Operators , Springer 1980

T. Kato, Perturbation Theory for Linear Operators , Springer 1980

work page 1980

[17] [17]

Liu, Hyperbolic conservation laws with relaxation, Comm

T.-P. Liu, Hyperbolic conservation laws with relaxation, Comm. Math. Phys. 108 (1987) 153–175

work page 1987

[18] [18]

Mascia and K

C. Mascia and K. Zumbrun, Pointwise Green’s function bounds and stability of relaxation shocks. Indiana Univ. Math. J. 51 (2002), no. 4, 773-904

work page 2002

[19] [19]

Mascia and K

C. Mascia and K. Zumbrun, Stability of large-amplitude shock proﬁles of general relax- ation systems, SIAM J. Math. Anal. 37 (2005), no. 3, 889-913

work page 2005

[20] [20]

Mennicken, M

R. Mennicken, M. M¨ oller, Non-self-adjoint Boundary Eigenvalue Problems . North- Holland Publ., Amsterdam (2003)

work page 2003

[21] [21]

Pedersen, Some operator monotone functions

G.K. Pedersen, Some operator monotone functions. Proc. Amer. Math. Soc. 36 (1972), 309–310

work page 1972

[22] [22]

Phillips, Selfadjoint Fredholm operators and spectral ﬂow, Canad

J. Phillips, Selfadjoint Fredholm operators and spectral ﬂow, Canad. Math. Bull. 39 (1996), 460–467

work page 1996

[23] [23]

Robbin and D

J. Robbin and D. Salamon, The Maslov index for paths , Topology 32 (1993) 827 – 844. 30

work page 1993

[24] [24]

Sandstede, Stability of travelling waves

B. Sandstede, Stability of travelling waves. In: Handbook of Dynamical Systems II (B Fiedler, ed.). North-Holland (2002) 983–1055

work page 2002

[25] [25]

Sandstede and A

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

work page 2000

[26] [26]

Spectral stability of hydraulic shock profiles

A. Sukhtayev, Z. Yang and K. Zumbrun, Spectral stability of hydraulic shock proﬁles, to appear in Physica D: Nonlinear Phenomena, arXiv:1810.01490

work page internal anchor Pith review Pith/arXiv arXiv

[27] [27]

Weidmann, Spectral theory of ordinary diﬀerential operators, Springer-Verlag 1987

J. Weidmann, Spectral theory of ordinary diﬀerential operators, Springer-Verlag 1987

work page 1987

[28] [28]

Yang, Traveling waves in an inclined channel and their stability, PhD

Z. Yang, Traveling waves in an inclined channel and their stability, PhD. thesis, Indiana University (2019) xxii+ 2012 pp

work page 2019

[29] [29]

Yang and K

Z. Yang and K. Zumbrun, Stability of hydraulic shock proﬁles, preprint; arXiv:1809.02912

work page arXiv

[30] [30]

Zumbrun, Dynamical stability of phase transitions in the p-system with viscosity- capillarity, SIAM J

K. Zumbrun, Dynamical stability of phase transitions in the p-system with viscosity- capillarity, SIAM J. Appl. Math. 60 (2000), no. 6, 1913–1924 (electronic)

work page 2000

[31] [31]

Zumbrun, Stability and dynamics of viscous shock waves, Nonlinear conservation laws and applications, 123–167, IMA Vol

K. Zumbrun, Stability and dynamics of viscous shock waves, Nonlinear conservation laws and applications, 123–167, IMA Vol. Math. Appl., 153, Springer, New York, 2011. 31

work page 2011