Heat Conduction with {\it aging} memory

Claudio Giorgi; Sandra Carillo

arxiv: 2412.14725 · v1 · submitted 2024-12-19 · 🧮 math-ph · math.MP

Heat Conduction with {it aging} memory

Sandra Carillo , Claudio Giorgi This is my paper

Pith reviewed 2026-05-23 07:35 UTC · model grok-4.3

classification 🧮 math-ph math.MP

keywords heat conductionmaterials with memoryagingrelaxation functiondeteriorationtemperature evolutionthermodynamics

0 comments

The pith

Temperature evolution in a rigid heat conductor with memory is governed by an age-dependent relaxation function that incorporates material deterioration over time.

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

The paper models heat conduction in materials whose thermal response depends on both current conditions and the full history of the process. It extends this by making the relaxation function itself vary with the material's age to represent deterioration. A reader would care because standard memory models assume fixed material properties, yet real materials often weaken or change response as they age. The analysis centers on the resulting temperature evolution equation for a rigid conductor.

Core claim

The authors analyze the temperature evolution within a rigid heat conductor with memory by letting the relaxation function account for aging, specifically variations due to possible deterioration of the thermal response related to its age.

What carries the argument

The age-dependent relaxation function, which modifies the thermal response to include deterioration with material age.

If this is right

The governing equations now include explicit time variation in the memory kernel due to aging.
Temperature solutions reflect cumulative effects of both process history and material age.
The model distinguishes aging effects from standard fixed-memory conduction.
Predictions of long-term heat flow change when deterioration is included.

Where Pith is reading between the lines

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

- Such models might be tested by aging samples under controlled conditions and measuring changes in effective conductivity.
- Numerical schemes for the integro-differential equation would need to track both time and material age as separate variables.
- Extensions could link the aging function to specific damage mechanisms like oxidation or fatigue.

Load-bearing premise

The specific functional form chosen for how the relaxation function changes with age correctly captures physical deterioration.

What would settle it

Direct comparison of measured temperature profiles over time in a physical sample whose age and thermal response are tracked against predictions from the age-dependent model.

read the original abstract

The term material with memory is generally used to indicate materials whose mechanical and/or thermodynamical behaviour depends not only on the process at the present time but also on the history of the process itself. Crucial in heat conductors with memory is the heat relaxation function which models the thermal response of the material. The present study is concerned about a thermodynamical problem with memory "aging"; that is, we analyze the temperature evolution within a rigid heat conductor with memory whose relaxation function takes into account the aging of the material. In particular, we account for variations of the relaxation function due to a possible deterioration of the thermal response of the material related to its age.

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

A straightforward mathematical extension of heat conduction with memory to let the kernel age with the material, but the aging is introduced as a constitutive choice without fresh physical justification.

read the letter

The core move is to let the relaxation function in a rigid heat conductor with memory depend explicitly on the material's age, so that thermal response can weaken over time. They then look at the resulting temperature evolution equation. That is the actual new element relative to the standard memory models they cite. The analysis appears to follow the usual steps for such integro-differential problems, so the formal steps are probably routine once the kernel is fixed. Credit for making the aging explicit and writing down the problem cleanly. The main limitation is that the functional form of the age dependence is simply posited; nothing in the abstract or the described claim supplies an independent derivation or experimental anchor for why the kernel should deteriorate in that particular way. It is a modeling decision, not a derived result. No internal contradiction shows up in the stated claim, and the circularity risk is low because the aging is treated as an input rather than something inferred from the solution. The work stays within the narrow lane of mathematical physics papers on materials with memory. Readers already working on constitutive models for aging or deteriorating media will see the incremental step; outsiders will not find new techniques or resolved open questions. It is solid enough on its own terms to merit referee time, though the referee will likely press on the physical motivation for the aging kernel and whether the results change qualitatively under other reasonable choices.

Referee Report

0 major / 2 minor

Summary. The manuscript analyzes the temperature evolution in a rigid heat conductor with memory whose relaxation function is modified to incorporate aging effects, specifically accounting for possible deterioration of the thermal response due to the material's age.

Significance. If the derivations hold, the work extends classical models of heat conduction with memory to include time-dependent aging of the relaxation kernel. This provides a mathematical framework for thermodynamical problems involving material degradation, which may be relevant for long-term thermal analysis in materials science. The constitutive modeling choice and resulting evolution equation constitute the core contribution.

minor comments (2)

[Abstract] Abstract: The abstract describes the modeling goal but does not include the explicit form of the age-dependent relaxation function, the governing PDE, or key results; adding a brief statement of the central equation and main theorem would improve accessibility.
[Introduction or Modeling section] The physical motivation for the chosen functional form of the aging kernel is presented as a constitutive assumption; a short discussion of its consistency with thermodynamic restrictions (e.g., positivity or monotonicity conditions) would strengthen the presentation.

Simulated Author's Rebuttal

0 responses · 0 unresolved

We thank the referee for their positive assessment of our manuscript and for recommending minor revision. The referee's summary accurately reflects the scope and contribution of the work on heat conduction with aging memory.

Circularity Check

0 steps flagged

No significant circularity; derivation is self-contained mathematical analysis

full rationale

The paper performs a mathematical analysis of temperature evolution under an age-dependent relaxation kernel presented as a constitutive modeling choice. No equations, predictions, or load-bearing steps are shown that reduce by construction to fitted inputs, self-citations, or renamed known results. The functional form is adopted by modeling decision rather than derived from prior results within the paper, and the analysis proceeds from the stated constitutive assumption without circular reduction. This is the normal case of a self-contained modeling study.

Axiom & Free-Parameter Ledger

0 free parameters · 0 axioms · 0 invented entities

Abstract-only; no explicit free parameters, axioms, or invented entities can be extracted beyond the modeling decision to include an age-dependent relaxation function.

pith-pipeline@v0.9.0 · 5627 in / 1026 out tokens · 13976 ms · 2026-05-23T07:35:18.590472+00:00 · methodology

discussion (0)

Reference graph

Works this paper leans on

25 extracted references · 25 canonical work pages

[1]

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work page 2024
[2]

Hristov J., The Fading Memory Formalism with Mittag-Leﬄer-Type K ernels as A Generator of Non- Local Operators (2023) Applied Sciences (Switzerland), 13 (5), 3 065

work page 2023
[3]

Sixty Years of Thermodynamics of Continuous Media (1963-2 023)

Giorgi C., Morro A., Zullo F., Modeling of heat conduction through ra te equations, Meccanica(special issue “Sixty Years of Thermodynamics of Continuous Media (1963-2 023)”), (2024)

work page 1963
[4]

II: Quasi-static behavior of Bars (20 18) Journal of Engineering Mechanics, 144 (2), 04017165

Piccolo V., Alaimo G., Chiappini A., Ferrari M., Zonta D., Zingales M., Des eri L., Fractional-order theory of thermoelasticity. II: Quasi-static behavior of Bars (20 18) Journal of Engineering Mechanics, 144 (2), 04017165

work page
[5]

Journal of Thermal Stresses, 34 (2011) 48 8–535

Hilton, H.H., Equivalences and Contrasts of Thermo-Elasticity and Thermo-Viscoelasticity: A Com- prehensive Critique. Journal of Thermal Stresses, 34 (2011) 48 8–535

work page 2011
[6]

Release, 335, 541–556

Li, Z., Li, Y., Chen, C., Cheng, Y., Magnetic-responsive hydrogels: From strategic design to biomed- ical applications (2021) Journal Contr. Release, 335, 541–556

work page 2021
[7]

Grmela M., Multiscale thermodynamics, Entropy, 23 (2021) 165

work page 2021
[8]

Coleman B.D., Thermodynamics of materials with memory Arch. Rat. Mech. Anal. , 17 (1964) 1–46

work page 1964
[9]

Gurtin M.E., Pipkin A.C., A general theory of heat conduction with ﬁn ite wave speeds, Arch. Rat. Mech. Anal., 31 (1968) 113–126

work page 1968
[10]

, Sulla conduzione del calore Atti Sem

Cattaneo C. , Sulla conduzione del calore Atti Sem. Mat. Fis. Universit´ a Modena, 3 (1948) 83–101

work page 1948
[11]

Coleman B.D., Dill E.H., On thermodynamics and stability of materials w ith memory, Arch. Rat. Mech. Anal. 1, 1–53 (1973)

work page 1973
[12]

Giorgi C., Gentili G., Thermodynamic properties and stability for t he heat ﬂux equation with linear memory, Quart. Appl. Math. , 51 (1993) 343–62

work page 1993
[13]

Amendola G., Fabrizio M., Golden J.M., Thermodynamics of materials w ith memory—theory and applications, second edition, Springer, Cham, 2021

work page 2021
[14]

Fabrizio M., Gentili G., Reynolds D.W., On rigid heat conductors with m emory, Int. J. Eng. Sci., 36 (1998) 765–782

work page 1998
[15]

Green, A.E., Naghdi P.M.: A re-examination of the basic postulate s of thermomechanics. Proc. R. Soc. Lond. A 432 (1991) 171-194

work page 1991
[16]

Quintanilla, R.: Moore-Gibson-Thompson thermoelasticity. Math . Mech. Solids 24 (2019), 4020-4031

work page 2019
[17]

Heat Transfer 117, 8-16 (1995) 11 SANDRA_CLAUDIO_2024 December 20, 2024, 1:41am

Tzou, D.Y.: A uniﬁed approach for heat conduction from macro t o micro-scales, ASME J. Heat Transfer 117, 8-16 (1995) 11 SANDRA_CLAUDIO_2024 December 20, 2024, 1:41am

work page 1995
[18]

Non-Equilib

Quintanilla, R.: Exponential stability in the dual-phase-lag heat co nduction theory, J. Non-Equilib. Thermodyn. 27, 217-227 (2002)

work page 2002
[19]

Giorgi C., Zullo F., Nonlinear and nonlocal models of heat conductio n: a continuum-thermodynamics based approach, arXiv: 2312.09892 (18 dec 2023)

work page arXiv 2023
[20]

A model of viscoelasticit y with time-dependent memory kernels

Conti, M.; Danese, V.; Giorgi, C.; Pata, V. A model of viscoelasticit y with time-dependent memory kernels. Amer. J. Math. 2018, 140, 349–389

work page 2018
[21]

Amendola G., Carillo S., Thermal work and minimum free energy in a he at conductor with memory, Quart. J. of Mech. Appl. Math., 57 (3), 429–446 (2004)

work page 2004
[22]

Theory and applications, Springer, New York, 2012

Amendola G., Fabrizio M., Golden J.M., Thermodynamics of materials w ith memory. Theory and applications, Springer, New York, 2012. xvi+574 pp. ISBN: 978-1- 4614-1691-3

work page 2012
[23]

Morro A., Giorgi C., Mathematical Modelling of Continuum Physics, Birkh¨ auser, Cham, 2023

work page 2023
[24]

Carillo S., Giorgi C., A magneto-viscoelasticity problem with aging, M aterials, MDPI, Basel, 15(21), 7810 (2022)

work page 2022
[25]

Carillo S., Chipot M., Valente V., Vergara Caﬀarelli G., A magneto-viscoelasticity problem with a singular memory kernel , Nonlinear Analysis Series B: Real World Applications, 35C, 200–210, (2017). 12

work page 2017

[1] [1]

Hristov J., The Integrals of Fractional Operators with Non-Sing ular Kernels: A Conceptual Ap- proach, Formulations, and Normalization Functions (2024) Progre ss in Fractional Diﬀerentiation and Applications, 10 (4), 627-662

work page 2024

[2] [2]

Hristov J., The Fading Memory Formalism with Mittag-Leﬄer-Type K ernels as A Generator of Non- Local Operators (2023) Applied Sciences (Switzerland), 13 (5), 3 065

work page 2023

[3] [3]

Sixty Years of Thermodynamics of Continuous Media (1963-2 023)

Giorgi C., Morro A., Zullo F., Modeling of heat conduction through ra te equations, Meccanica(special issue “Sixty Years of Thermodynamics of Continuous Media (1963-2 023)”), (2024)

work page 1963

[4] [4]

II: Quasi-static behavior of Bars (20 18) Journal of Engineering Mechanics, 144 (2), 04017165

Piccolo V., Alaimo G., Chiappini A., Ferrari M., Zonta D., Zingales M., Des eri L., Fractional-order theory of thermoelasticity. II: Quasi-static behavior of Bars (20 18) Journal of Engineering Mechanics, 144 (2), 04017165

work page

[5] [5]

Journal of Thermal Stresses, 34 (2011) 48 8–535

Hilton, H.H., Equivalences and Contrasts of Thermo-Elasticity and Thermo-Viscoelasticity: A Com- prehensive Critique. Journal of Thermal Stresses, 34 (2011) 48 8–535

work page 2011

[6] [6]

Release, 335, 541–556

Li, Z., Li, Y., Chen, C., Cheng, Y., Magnetic-responsive hydrogels: From strategic design to biomed- ical applications (2021) Journal Contr. Release, 335, 541–556

work page 2021

[7] [7]

Grmela M., Multiscale thermodynamics, Entropy, 23 (2021) 165

work page 2021

[8] [8]

Coleman B.D., Thermodynamics of materials with memory Arch. Rat. Mech. Anal. , 17 (1964) 1–46

work page 1964

[9] [9]

Gurtin M.E., Pipkin A.C., A general theory of heat conduction with ﬁn ite wave speeds, Arch. Rat. Mech. Anal., 31 (1968) 113–126

work page 1968

[10] [10]

, Sulla conduzione del calore Atti Sem

Cattaneo C. , Sulla conduzione del calore Atti Sem. Mat. Fis. Universit´ a Modena, 3 (1948) 83–101

work page 1948

[11] [11]

Coleman B.D., Dill E.H., On thermodynamics and stability of materials w ith memory, Arch. Rat. Mech. Anal. 1, 1–53 (1973)

work page 1973

[12] [12]

Giorgi C., Gentili G., Thermodynamic properties and stability for t he heat ﬂux equation with linear memory, Quart. Appl. Math. , 51 (1993) 343–62

work page 1993

[13] [13]

Amendola G., Fabrizio M., Golden J.M., Thermodynamics of materials w ith memory—theory and applications, second edition, Springer, Cham, 2021

work page 2021

[14] [14]

Fabrizio M., Gentili G., Reynolds D.W., On rigid heat conductors with m emory, Int. J. Eng. Sci., 36 (1998) 765–782

work page 1998

[15] [15]

Green, A.E., Naghdi P.M.: A re-examination of the basic postulate s of thermomechanics. Proc. R. Soc. Lond. A 432 (1991) 171-194

work page 1991

[16] [16]

Quintanilla, R.: Moore-Gibson-Thompson thermoelasticity. Math . Mech. Solids 24 (2019), 4020-4031

work page 2019

[17] [17]

Heat Transfer 117, 8-16 (1995) 11 SANDRA_CLAUDIO_2024 December 20, 2024, 1:41am

Tzou, D.Y.: A uniﬁed approach for heat conduction from macro t o micro-scales, ASME J. Heat Transfer 117, 8-16 (1995) 11 SANDRA_CLAUDIO_2024 December 20, 2024, 1:41am

work page 1995

[18] [18]

Non-Equilib

Quintanilla, R.: Exponential stability in the dual-phase-lag heat co nduction theory, J. Non-Equilib. Thermodyn. 27, 217-227 (2002)

work page 2002

[19] [19]

Giorgi C., Zullo F., Nonlinear and nonlocal models of heat conductio n: a continuum-thermodynamics based approach, arXiv: 2312.09892 (18 dec 2023)

work page arXiv 2023

[20] [20]

A model of viscoelasticit y with time-dependent memory kernels

Conti, M.; Danese, V.; Giorgi, C.; Pata, V. A model of viscoelasticit y with time-dependent memory kernels. Amer. J. Math. 2018, 140, 349–389

work page 2018

[21] [21]

Amendola G., Carillo S., Thermal work and minimum free energy in a he at conductor with memory, Quart. J. of Mech. Appl. Math., 57 (3), 429–446 (2004)

work page 2004

[22] [22]

Theory and applications, Springer, New York, 2012

Amendola G., Fabrizio M., Golden J.M., Thermodynamics of materials w ith memory. Theory and applications, Springer, New York, 2012. xvi+574 pp. ISBN: 978-1- 4614-1691-3

work page 2012

[23] [23]

Morro A., Giorgi C., Mathematical Modelling of Continuum Physics, Birkh¨ auser, Cham, 2023

work page 2023

[24] [24]

Carillo S., Giorgi C., A magneto-viscoelasticity problem with aging, M aterials, MDPI, Basel, 15(21), 7810 (2022)

work page 2022

[25] [25]

Carillo S., Chipot M., Valente V., Vergara Caﬀarelli G., A magneto-viscoelasticity problem with a singular memory kernel , Nonlinear Analysis Series B: Real World Applications, 35C, 200–210, (2017). 12

work page 2017