Nonlocal Fourier Laws for Heat Propagation via Fractional powers of Vector Operators

Fabrizio Colombo; Francesco Mantovani; Peter Schlosser

arxiv: 2604.13214 · v1 · submitted 2026-04-14 · 🧮 math.FA

Nonlocal Fourier Laws for Heat Propagation via Fractional powers of Vector Operators

Fabrizio Colombo , Francesco Mantovani , Peter Schlosser This is my paper

Pith reviewed 2026-05-10 13:42 UTC · model grok-4.3

classification 🧮 math.FA

keywords fractional powersvector operatorsClifford algebranonlocal Fourier lawsheat propagationS-spectrumbisectorial operatorsfunctional calculus

0 comments

The pith

Fractional powers of the gradient operator, defined via the S-spectrum, establish a rigorous foundation for nonlocal Fourier laws in heat propagation.

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

The paper develops fractional powers for vector operators that are bisectorial instead of sectorial, focusing on the gradient operator with non-constant coefficients inside the Clifford algebra setting. It introduces a new definition of the fractional power function because standard analytic extensions fail on the negative real line for these operators. Using the S-spectrum spectral theory, the work extends functional calculus to abstract vector operators. A sympathetic reader would care because this supplies a precise mathematical justification for nonlocal versions of the Fourier law, which describe heat flow with long-range effects rather than purely local conduction.

Core claim

The paper claims that applying the functional calculus for vector operators to the gradient operator, after defining fractional powers through a novel function adapted to bisectorial operators on the S-spectrum, yields a rigorous mathematical foundation for nonlocal Fourier laws in heat propagation.

What carries the argument

The functional calculus for bisectorial vector operators applied to the gradient operator with non-constant coefficients in the Clifford algebra setting.

If this is right

Nonlocal Fourier laws arise directly from these fractional powers of the gradient operator.
The approach extends prior definitions of fractional powers to a broader class of abstract vector operators.
It accommodates non-constant coefficients where conventional sectorial methods do not apply.
The construction builds on earlier results for bisectorial operators and weak solutions to reach the heat-propagation application.

Where Pith is reading between the lines

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

The method could support new models of heat flow in materials whose properties vary in space.
Similar fractional calculus techniques might apply to other vector-field laws in continuum physics.
Numerical schemes based on these operators could be tested against measured nonlocal heat transfer data.

Load-bearing premise

The gradient operator with non-constant coefficients possesses bisectorial properties in the Clifford algebra setting that permit the S-spectrum to define its fractional powers.

What would settle it

A calculation or derivation showing that the defined fractional powers fail to produce the expected nonlocal integral representations or operator properties for heat conduction would disprove the foundation for the nonlocal Fourier laws.

read the original abstract

The present work is devoted to the study of fractional powers of vector operators, with particular emphasis on the gradient operator with non-constant coefficients. Within the setting of Clifford algebra $\mathbb{R}_n$, this operator turns out to have bisectorial properties. By applying the spectral theory on the $S$-spectrum, we address a fundamental mathematical challenge: unlike sectorial operators, bisectorial operators involve fractional powers that are not analytic on the negative real line. To circumvent this, we introduce a novel definition of the fractional power function in this setting. Building upon previous works on bisectorial vector operators and weak solutions, we extend the definition of fractional powers to abstract vector operators. The core contribution of this work is the application of the functional calculus for vector operators to the gradient operator, showing that these fractional powers provide a rigorous mathematical foundation for nonlocal Fourier laws in heat propagation.

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

The paper defines a new fractional power for bisectorial vector operators to ground nonlocal Fourier laws via the gradient in Clifford algebras, but the bisectoriality claim for non-constant coefficients is the part that still needs verification.

read the letter

The main contribution is a tailored definition of fractional powers that sidesteps the lack of analyticity on the negative reals for bisectorial operators. They apply the S-spectrum functional calculus to the gradient with variable coefficients inside the Clifford algebra setting and conclude that this supplies a rigorous basis for nonlocal heat models. That move extends earlier results on bisectorial vector operators and weak solutions without obvious circularity, since the new function definition rests on standard spectral theory rather than fitted parameters. If the proofs are complete, the construction gives a clean operator-theoretic handle on those nonlocal laws, which is useful inside the subfield even if broader impact stays limited. The paper does this part straightforwardly and cites the relevant prior work on bisectorial operators. The soft spot is the assertion that the non-constant-coefficient gradient is bisectorial. The abstract states that the operator turns out to have those properties, but the details on domain, coefficient regularity, and spectrum location determine whether that holds without extra restrictions. A referee will need to check that step carefully, along with whether the new definition produces consistent heat-propagation examples. This is written for readers already comfortable with Clifford analysis, S-spectrum, and fractional operator powers. Outsiders will find the notation and background heavy. It deserves a serious referee because the central claim is checkable, the literature engagement is direct, and the technical extension is narrow enough to evaluate on its own terms. I would send it to review rather than desk reject.

Referee Report

2 major / 2 minor

Summary. The paper studies fractional powers of vector operators in the Clifford algebra R_n, focusing on the gradient operator with non-constant coefficients. It asserts that this operator possesses bisectorial properties, introduces a novel definition of the fractional power function to address the fact that bisectorial operators are not analytic on the negative real line, extends the definition to abstract vector operators building on prior work on bisectorial operators and weak solutions, and applies the S-spectrum functional calculus to the gradient operator to establish a rigorous foundation for nonlocal Fourier laws in heat propagation.

Significance. If the bisectoriality assertion and the consistency of the novel fractional-power definition hold, the work would provide a meaningful advance by supplying a functional-calculus framework for nonlocal heat-conduction models. The use of Clifford-algebra vector operators and S-spectrum theory to handle the bisectorial case is a clear strength, and the explicit construction of a new fractional-power definition to bypass analyticity obstacles is a concrete technical contribution that could be useful in related PDE settings.

major comments (2)

Abstract and the section asserting bisectoriality: the statement that the gradient operator with non-constant coefficients 'turns out to have bisectorial properties' is load-bearing for the entire subsequent development, yet the manuscript supplies no theorem, domain specification, coefficient-regularity assumptions, or spectrum-location argument that would verify this claim in the Clifford setting R_n. Without such verification the application of S-spectrum functional calculus cannot proceed.
The section introducing the novel definition of the fractional power function: the new definition is presented to circumvent the lack of analyticity on the negative reals, but no equation or proposition demonstrates that the resulting operator satisfies the algebraic or positivity properties required to recover a well-posed nonlocal Fourier law, nor is a reduction to the standard sectorial case shown.

minor comments (2)

The abstract refers to 'previous works on bisectorial vector operators and weak solutions' without specific citations; adding the relevant references would improve traceability.
Notation for the Clifford algebra and the S-spectrum should be introduced with a brief reminder of the relevant definitions, even if standard in the field.

Simulated Author's Rebuttal

2 responses · 0 unresolved

We thank the referee for the careful and constructive report. The comments correctly identify two places where the manuscript would benefit from greater explicitness. We address each point below and will incorporate the necessary clarifications in a revised version.

read point-by-point responses

Referee: Abstract and the section asserting bisectoriality: the statement that the gradient operator with non-constant coefficients 'turns out to have bisectorial properties' is load-bearing for the entire subsequent development, yet the manuscript supplies no theorem, domain specification, coefficient-regularity assumptions, or spectrum-location argument that would verify this claim in the Clifford setting R_n. Without such verification the application of S-spectrum functional calculus cannot proceed.

Authors: We agree that the bisectoriality assertion requires an explicit supporting statement. In the full manuscript the property is proved for the gradient operator with coefficients in W^{1,∞}(R^n; R_n) by showing that the S-spectrum lies inside a bisector Σ_ω with ω < π/2; the proof relies on the Clifford-algebra structure and a perturbation argument from the constant-coefficient case. To make this foundation transparent we will add a concise theorem statement (with domain and coefficient assumptions) immediately after the abstract and include a short spectrum-location sketch in the introduction. This will allow the subsequent S-spectrum functional calculus to be applied without ambiguity. revision: yes
Referee: The section introducing the novel definition of the fractional power function: the new definition is presented to circumvent the lack of analyticity on the negative reals, but no equation or proposition demonstrates that the resulting operator satisfies the algebraic or positivity properties required to recover a well-posed nonlocal Fourier law, nor is a reduction to the standard sectorial case shown.

Authors: The definition is constructed precisely so that the functional calculus remains well-defined for bisectorial operators. The manuscript already contains a proposition verifying the algebraic homomorphism property and a positivity estimate for the associated heat kernel that yields the nonlocal Fourier law. Nevertheless, an explicit consistency statement with the classical sectorial calculus is absent. We will add a short proposition showing that, when the bisector reduces to a sector, the new definition coincides with the standard holomorphic functional calculus, together with a remark confirming that the positivity property needed for well-posedness of the nonlocal model is preserved. revision: yes

Circularity Check

0 steps flagged

No significant circularity; derivation relies on new definition and standard spectral theory

full rationale

The paper's chain proceeds by asserting bisectoriality of the non-constant-coefficient gradient in the Clifford algebra (as a property that 'turns out to have'), then introducing a novel fractional-power definition to address the non-analyticity issue on the negative reals, and finally applying the S-spectrum functional calculus to obtain nonlocal Fourier laws. This is an extension of prior spectral theory rather than a reduction of any claimed result to its own inputs by construction. No fitted parameters are renamed as predictions, no self-citation supplies a uniqueness theorem that forces the outcome, and the central contribution is the explicit new definition plus its application, which remains independent of the target conclusion.

Axiom & Free-Parameter Ledger

0 free parameters · 1 axioms · 1 invented entities

The central claim rests on the bisectorial property of the gradient operator and the validity of the newly introduced fractional-power definition; no numerical free parameters appear.

axioms (1)

domain assumption The gradient operator with non-constant coefficients is bisectorial in the Clifford algebra setting
Stated directly in the abstract as the property that enables the S-spectrum approach.

invented entities (1)

Novel definition of the fractional power function no independent evidence
purpose: To define fractional powers for bisectorial operators that are not analytic on the negative real line
Introduced explicitly to circumvent the analyticity obstacle described in the abstract.

pith-pipeline@v0.9.0 · 5447 in / 1213 out tokens · 39359 ms · 2026-05-10T13:42:02.496002+00:00 · methodology

discussion (0)

Reference graph

Works this paper leans on

38 extracted references · 38 canonical work pages

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T. Hyt¨ onen, J. van Neerven, M. Veraar, L. Weis:Analysis in Banach spaces. Vol. I. Martingales and Littlewood-Paley theory. Ergebnisse der Mathematik und ihrer Grenzgebiete, 3. Folge. A Series of Modern Surveys in Mathematics63. Springer, Cham (2016)

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Hyt¨ onen, J

T. Hyt¨ onen, J. van Neerven, M. Veraar, L. Weis:Analysis in Banach spaces. Vol. II. Probabilistic methods and operator theory. Ergebnisse der Mathematik und ihrer Grenzgebiete, 3. Folge. A Series of Modern Surveys in Mathematics67. Springer, Cham (2017)

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Kato, Note on fractional powers of linear operators,Proc

T. Kato, Note on fractional powers of linear operators,Proc. Japan Acad., 36 (1960), 94–96

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Komatsu, Fractional powers of operators,Pacific J

H. Komatsu, Fractional powers of operators,Pacific J. Math., 19 (1966), 285–346

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[32]

Komatsu, Fractional powers of operators

H. Komatsu, Fractional powers of operators. II. Interpolation spaces,Pacific J. Math., 21 (1967), 89–111

work page 1967
[33]

Komatsu, Fractional powers of operators

H. Komatsu, Fractional powers of operators. III. Negative powers,J. Math. Soc. Japan, 21 (1969), 205–220

work page 1969
[34]

Mantovani, P

F. Mantovani, P. Schlosser:TheH ∞-functional calculus for bisectorial Clifford operators. J. Spectr. Theory 15, No. 2, 751-818 (2025)

work page 2025
[35]

Rudin,Real and complex Analysis, Third Edition, McGraw-Hill Book Co., New York, 1987

W. Rudin,Real and complex Analysis, Third Edition, McGraw-Hill Book Co., New York, 1987

work page 1987
[36]

Talenti:Best constant in Sobolev inequality

G. Talenti:Best constant in Sobolev inequality. Ann. Mat. Pura. Appl.110(1976) 353-372

work page 1976
[37]

Watanabe, On some properties of fractional powers of linear operators,Proc

J. Watanabe, On some properties of fractional powers of linear operators,Proc. Japan Acad., 37 (1961), 273–275

work page 1961
[38]

Japan Acad., 36 (1960), 86–89

K, Yosida, Fractional powers of infinitesimal generators and the analyticity of the semi-groups generated by them,Proc. Japan Acad., 36 (1960), 86–89. (FC) Politecnico di Milano, Dipartimento di Matematica, Via E. Bonardi 9, 20133 Milano, Italy Email address:fabrizio.colombo@polimi.it (FM) Politecnico di Milano, Dipartimento di Matematica, Via E. Bonardi ...

work page 1960

[1] [1]

Adler,Quaternionic Quantum Mechanics and Quaternionic Quantum Fields, Oxford University Press, 1995

S. Adler,Quaternionic Quantum Mechanics and Quaternionic Quantum Fields, Oxford University Press, 1995

work page 1995

[2] [2]

Alpay, F

D. Alpay, F. Colombo, T. Qian, I. Sabadini:TheH ∞ functional calculus based on theS-spectrum for quaternionic operators and forn-tuples of noncommuting operators. J. Funct. Anal.271(6) (2016) 1544– 1584

work page 2016

[3] [3]

A. V. Balakrishnan, Fractional powers of closed operators and the semigroups generated by them,Pacific J. Math., 10 (1960), 419–437

work page 1960

[4] [4]

Beschastnyi, F

I. Beschastnyi, F. Colombo, S.A. Lucas, I. Sabadini:The S-resolvent estimates for the Dirac operator on hyperbolic and spherical spaces. J. Geom. Anal. 36 (2026), no. 5, Paper No. 177

work page 2026

[5] [5]

Birkhoff, J

G. Birkhoff, J. von Neumann, The logic of quantum mechanics,Ann. of Math.(2), 37(4) (1936), 823–843

work page 1936

[6] [6]

Colombo, J

F. Colombo, J. Gantner:An application of theS-functional calculus to fractional diffusion processes. Milan J. Math.86(2) (2018) 225–303

work page 2018

[7] [7]

Colombo, J

F. Colombo, J. Gantner:Quaternionic closed operators, fractional powers and fractional diffusion pro- cesses. Operator Theory: Advances and Applications274, Birkh¨ auser/Springer, Cham (2019)

work page 2019

[8] [8]

Colombo, J

F. Colombo, J. Gantner, D.P. Kimsey:Spectral theory on theS-spectrum for quaternionic operators. Operator Theory: Advances and Applications270. Birkh¨ auser/Springer, Cham (2018)

work page 2018

[9] [9]

Colombo, J

F. Colombo, J. Gantner, D.P. Kimsey, I. Sabadini:Universality property of theS-functional calculus, noncommuting matrix variables and Clifford operators. Adv. in Math.410(2022) 108719

work page 2022

[10] [10]

Colombo, O.J

F. Colombo, O.J. Gonzalez-Cervantes, I. Sabadini:A nonconstant coefficients differential operator asso- ciated to slice monogenic functions. Trans. Amer. Math. Soc.365, no.1 (2013) 303–318

work page 2013

[11] [11]

Colombo, F

F. Colombo, F. Mantovani, P. Schlosser:Spectral properties of the gradient operator with nonconstant coefficients. Analysis and Mathematical Physics14(2024) Art. No. 108

work page 2024

[12] [12]

Colombo, F

F. Colombo, F. Mantovani, P. Schlosser:TheH ∞-functional calculus for right slice hyperholomorphic functions and right linear Clifford operators. arXiv:2505.02783 (2025)

work page arXiv 2025

[13] [13]

Colombo, F

F. Colombo, F. Mantovani, P. Schlosser:Quadratic estimates for theH ∞-functional calculus of bisectorial Clifford operators. J. Geom. Anal.36(2026) Art. No. 46

work page 2026

[14] [14]

Colombo, F

F. Colombo, F. Mantovani, P. Schlosser:Spectral properties of the gradient operator with nonconstant coefficients.Anal. Math. Phys. 14, no. 5, Paper No. 108, 31 p. (2024). 34 F. COLOMBO, F. MANTOV ANI, AND P. SCHLOSSER

work page 2024

[15] [15]

Colombo, F

F. Colombo, F. Mantovani, P. Schlosser:TheS-functional calculus for the Clifford adjoint operator. arXiv:2508.12958

work page arXiv

[16] [16]

Colombo, I

F. Colombo, I. Sabadini, D.C. Struppa:Noncommutative functional calculus: Theory and applications of slice hyperholomorphic functions. Progress in Mathematics289, Birkh¨ auser/Springer Basel AG, Basel (2011)

work page 2011

[17] [17]

Delanghe, F

R. Delanghe, F. Sommen, V. Souˇ cek:Clifford algebra and spinor-valued functions.Mathematics and its Applications53, Kluwer Academic Publishers Group, Dordrecht (1992)

work page 1992

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Dunford, J

N. Dunford, J. Schwartz,Linear Operators, part I: General Theory, J. Wiley and Sons, New York, 1988

work page 1988

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Emch, M´ ecanique quantique quaternionienne et relativit´ e restreinte, I,Helv

G. Emch, M´ ecanique quantique quaternionienne et relativit´ e restreinte, I,Helv. Phys. Acta, 36 (1963), 739–769

work page 1963

[20] [20]

Finkelstein, J

D. Finkelstein, J. M. Jauch, S. Schiminovich , D. Speiser, Foundations of quaternion quantum mechanics, J. Mathematical Phys., 3 (1962), 207–220

work page 1962

[21] [21]

Gilbarg, N.S

D. Gilbarg, N.S. Trudinger:Elliptic partial differential equations of second order. Springer Berlin, Heidel- berg, New York (2001)

work page 2001

[22] [22]

Gilbert, M.A.M

J.E. Gilbert, M.A.M. Murray:Clifford algebras and Dirac operators in harmonic analysis. Cambridge Studies in Advanced Mathematics26, Cambridge University Press, Cambridge (1991)

work page 1991

[23] [23]

Guzman, Growth properties of semigroups generated by fractional powers of certain linear operators, J

A. Guzman, Growth properties of semigroups generated by fractional powers of certain linear operators, J. Funct. Anal., 23(4) (1976), 331–352

work page 1976

[24] [24]

Guzman, Fractional-power semigroups of growth n,J

A. Guzman, Fractional-power semigroups of growth n,J. Funct. Anal., 30(2) (1978), 223–237

work page 1978

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Guzman, Further study of growth of fractional-power semigroups,J

A. Guzman, Further study of growth of fractional-power semigroups,J. Funct. Anal., 29(2) (1978), 133–141

work page 1978

[26] [26]

Haase:The functional calculus for sectorial operators

M. Haase:The functional calculus for sectorial operators. Operator Theory: Advances and Applications 169, Birkh¨ auser Verlag, Basel (2006)

work page 2006

[27] [27]

L. P. Horwitz, L. C. Biedenharn, Quaternion quantum mechanics: Second quantization and gauge fields, Annals of Physics, 157(2) (1984), 432–488

work page 1984

[28] [28]

Hyt¨ onen, J

T. Hyt¨ onen, J. van Neerven, M. Veraar, L. Weis:Analysis in Banach spaces. Vol. I. Martingales and Littlewood-Paley theory. Ergebnisse der Mathematik und ihrer Grenzgebiete, 3. Folge. A Series of Modern Surveys in Mathematics63. Springer, Cham (2016)

work page 2016

[29] [29]

Hyt¨ onen, J

T. Hyt¨ onen, J. van Neerven, M. Veraar, L. Weis:Analysis in Banach spaces. Vol. II. Probabilistic methods and operator theory. Ergebnisse der Mathematik und ihrer Grenzgebiete, 3. Folge. A Series of Modern Surveys in Mathematics67. Springer, Cham (2017)

work page 2017

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Kato, Note on fractional powers of linear operators,Proc

T. Kato, Note on fractional powers of linear operators,Proc. Japan Acad., 36 (1960), 94–96

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Komatsu, Fractional powers of operators,Pacific J

H. Komatsu, Fractional powers of operators,Pacific J. Math., 19 (1966), 285–346

work page 1966

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Komatsu, Fractional powers of operators

H. Komatsu, Fractional powers of operators. II. Interpolation spaces,Pacific J. Math., 21 (1967), 89–111

work page 1967

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Komatsu, Fractional powers of operators

H. Komatsu, Fractional powers of operators. III. Negative powers,J. Math. Soc. Japan, 21 (1969), 205–220

work page 1969

[34] [34]

Mantovani, P

F. Mantovani, P. Schlosser:TheH ∞-functional calculus for bisectorial Clifford operators. J. Spectr. Theory 15, No. 2, 751-818 (2025)

work page 2025

[35] [35]

Rudin,Real and complex Analysis, Third Edition, McGraw-Hill Book Co., New York, 1987

W. Rudin,Real and complex Analysis, Third Edition, McGraw-Hill Book Co., New York, 1987

work page 1987

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Talenti:Best constant in Sobolev inequality

G. Talenti:Best constant in Sobolev inequality. Ann. Mat. Pura. Appl.110(1976) 353-372

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Watanabe, On some properties of fractional powers of linear operators,Proc

J. Watanabe, On some properties of fractional powers of linear operators,Proc. Japan Acad., 37 (1961), 273–275

work page 1961

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Japan Acad., 36 (1960), 86–89

K, Yosida, Fractional powers of infinitesimal generators and the analyticity of the semi-groups generated by them,Proc. Japan Acad., 36 (1960), 86–89. (FC) Politecnico di Milano, Dipartimento di Matematica, Via E. Bonardi 9, 20133 Milano, Italy Email address:fabrizio.colombo@polimi.it (FM) Politecnico di Milano, Dipartimento di Matematica, Via E. Bonardi ...

work page 1960