Detection of time-varying heat sources using an analytic forward model

Janne P. Tamminen

arxiv: 1906.12156 · v1 · pith:BDAGI7VOnew · submitted 2019-06-28 · 🧮 math.NA · cs.NA

Detection of time-varying heat sources using an analytic forward model

Janne P. Tamminen This is my paper

Pith reviewed 2026-05-25 13:38 UTC · model grok-4.3

classification 🧮 math.NA cs.NA

keywords heat source detectionanalytic forward modelheat equationpoint sourcetime-varying sourcesinverse problemfinite element simulation

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The pith

An analytic point source model solves the three-dimensional heat equation for both static and time-varying sources and supports detection of their locations and spectra.

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

The paper establishes a closed-form expression for the temperature field generated by point-like heat sources that may vary in time, and shows that this expression satisfies the heat equation exactly in three dimensions. An accurate analytic forward model matters for inverse problems because temperature measurements alone do not uniquely determine the sources, so a fast and exact forward map can simplify reconstruction. The authors derive simple detection procedures for source position and frequency content, then verify them on finite-element simulations of the heat equation. They note that the same framework could be used to locate manufacturing defects or abnormal tissue conditions.

Core claim

A simple analytic point source model is presented for both static and time-varying point-like heat sources and the resulting temperature profile that solves the heat equation in dimension three. Simple algorithms to detect the location and spectral content of these sources are developed and numerically tested using Finite Element Mesh simulations. The resulting framework for heat source reconstruction problems, which are ill-posed inverse problems, seems promising.

What carries the argument

Analytic point-source solution to the three-dimensional heat equation that remains valid when source strength varies with time.

If this is right

Location of both static and time-varying sources can be recovered from temperature data by simple fitting procedures.
The frequency content of oscillating sources can be extracted directly from the same temperature field.
The analytic forward map turns an ill-posed inverse problem into a more tractable parameter-estimation task.
The same expressions apply to material-defect detection and to locating abnormal heat sources in medical imaging.

Where Pith is reading between the lines

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

If real materials have boundaries, the infinite-medium solution could be corrected by the method of images or by adding a separate boundary-correction term.
Experimental temperature time series with known embedded heat sources would directly test whether measurement noise or model mismatch prevents reliable recovery of source parameters.
The same closed-form approach may extend to other linear diffusion problems whose fundamental solutions are known.

Load-bearing premise

The sources behave as idealized mathematical points inside an infinite homogeneous medium with no boundaries or material interfaces.

What would settle it

A direct numerical solution of the heat equation for a delta-function source in infinite space that produces a temperature field measurably different from the closed-form expression at any point and time.

Figures

Figures reproduced from arXiv: 1906.12156 by Janne P. Tamminen.

**Figure 1.** Figure 1: Distinguishability of a static, spherical heat source with Q = 29000W/m3 and radius R = 1cm. Diffusivity α is in units m2/s. See text for further explanation on distinguishability. analysis on the boundary temperature data, which entails the full temperature data between the hottest spot and the nearby area, up to 5cm radius. Fat and muscle tissue have diffusivity of 0.98E-7 and 1.31E-7 respectively, which… view at source ↗

**Figure 2.** Figure 2: Distinguishability of a dynamic, spherical heat source with S = 29000W/m3 , radius 1 cm and frequency 0.15 Hz. Diffusivity α is in units m2/s. See text for further explanation on distinguishability. 2.4. Some examples. Consider a phase-modulated source and its series expansion (17) s(t) = cos(ωt + B sin(ωmt)) = X∞ k=−∞ Jk(B) cos((ω + kωm)t), where ωm is the frequency of modulation and Jk(x) is a Bessel fu… view at source ↗

**Figure 3.** Figure 3: Distinguishability of a dynamic, spherical heat source with S = 29000W/m3 , radius 1 cm and frequency 0.50 Hz. Diffusivity α is in units m2/s. See text for further explanation on distinguishability. The first term can be thought of as our signal of interest, the second introduces sidelobes situated ωa away from the original, with amplitudes M/2. Again as with the phase-modulated source, each of these comp… view at source ↗

**Figure 4.** Figure 4: Distinguishability of a dynamic, spherical heat source with S = 29000W/m3 , radius 1 cm and frequency 1.0 Hz. Diffusivity α is in units m2/s. See text for further explanation on distinguishability. more mathematical background dealing with uniqueness and establishing the problem as an inverse problem is given by J. R. Cannon in [8, 9] and in numerous other papers by the same author. Continuing the analyt… view at source ↗

**Figure 5.** Figure 5: The temperature measurement patch of heat source A with power 1.0, non-noisy simulation and three simulated noise levels. the boundary, non-noisy and with three different simulated noise levels, from static cases A1 and C2. The two figures use the same temperature scale and colormap and shows how much smaller and more difficult to detect the ”hot spot” becomes as the heat source is located deeper in the do… view at source ↗

**Figure 6.** Figure 6: The temperature measurement patch of heat source C with power 0.8, non-noisy simulation and three simulated noise levels. we used 303 different source candidate locations, giving inherently a bit smaller detection resolution. 6.1. Static reconstructions. In table 2 are the results of the static simulations. The location column has the distance from the reconstructed source center to the true source center … view at source ↗

**Figure 7.** Figure 7: On the left: the measurement patches for heat sources A,B and C with power 1.0. On the right: temperature patches that gave the lowest error. to realistic and noisy. This simple model can in principle be used to approximate more complicated cases. The numerical simulations turned out to be very challenging as we would need high numerical accuracy in 4D. In the future we hope to revisit the simulations with… view at source ↗

**Figure 8.** Figure 8: Simulated FFT amplitude, f = 0.2Hz, of sources A2 and B1 on the left. Best fit using the amplitude information in the middle. Best fit using the phase information on the right. The lower row corresponding to the source B1 which is situated more deep is multiplied by 10 to be visible in the same color map. mesh and possibly by adjusting FEM solver parameters. This is a challenging and laborous task in itsel… view at source ↗

**Figure 9.** Figure 9: Simulated FFT phase, f = 0.2Hz, of sources A2 and B1 on the left. Best fit using the amplitude information in the middle. Best fit using the phase information on the right. All of these phase images have been normalized to show their shape in relation to one another. The results of tables 2, 3 and 4 have to be taken critically because of the accuracy problems of the simulations and inherent complexity of t… view at source ↗

read the original abstract

We present a simple, analytic point source model for both static and time-varying point-like heat sources and the resulting temperature profile that solves the heat equation in dimension three. Simple algorithms to detect the location and spectral content of these sources are developed and numerically tested using Finite Element Mesh simulations. The resulting framework for heat source reconstruction problems, which are ill-posed inverse problems, seems promising and warrants for future research. Possible fields of application for our work are material testing, to detect manufacturing defects, and medical imaging to detect abnormal health conditions.

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

Packages the standard Green's function for the 3D heat equation into detection algorithms and tests them on FEM data, but the validation skips any check on the infinite-domain assumption versus finite meshes.

read the letter

The main point is that this paper takes the textbook Green's function solution for a point heat source in infinite 3D space, writes it out for both static and time-varying cases, and then builds simple algorithms to recover source location and frequency content from temperature readings. They run those algorithms on finite-element simulations and call the framework promising for inverse problems. That's the actual content; nothing deeper is claimed or shown in the abstract or stress-test notes.

Referee Report

2 major / 1 minor

Summary. The manuscript presents an analytic forward model for static and time-varying point-like heat sources based on the Green's function solution to the three-dimensional heat equation in an infinite homogeneous medium. It derives simple detection algorithms for source location and spectral content and reports numerical tests of these algorithms on data generated by Finite Element Method (FEM) simulations. The work positions the framework as promising for ill-posed inverse problems in material testing and medical imaging.

Significance. If the analytic derivation is free of gaps and the detection algorithms remain effective when the infinite-domain assumption is relaxed, the parameter-free Green's function approach would supply a computationally lightweight starting point for heat-source reconstruction. The explicit grounding in the heat equation and the absence of free parameters in the forward model are strengths that distinguish the contribution from purely data-driven methods.

major comments (2)

[Numerical validation] Numerical validation section: the manuscript reports that algorithms were tested on FEM data but provides no quantitative error analysis (e.g., L² or pointwise discrepancy) between the closed-form analytic temperature field and the FEM output. This comparison is load-bearing for the claim that the numerical tests support the analytic model, because the FEM computations are performed on finite meshes while the analytic solution assumes an infinite domain.
[Model assumptions and FEM setup] Model assumptions and FEM setup: the forward model is derived under the idealization of an infinite homogeneous medium, yet the FEM tests use finite computational domains without reported boundary conditions, domain-size sensitivity studies, or tests on distributed sources or material interfaces. These omissions directly affect whether the detection algorithms can be expected to transfer to the applications listed in the abstract.

minor comments (1)

[Abstract] Abstract: the clause 'warrants for future research' is grammatically incorrect and should read 'warrants future research'.

Simulated Author's Rebuttal

2 responses · 0 unresolved

We thank the referee for their thoughtful review and constructive comments. Below we provide point-by-point responses to the major comments.

read point-by-point responses

Referee: [Numerical validation] Numerical validation section: the manuscript reports that algorithms were tested on FEM data but provides no quantitative error analysis (e.g., L² or pointwise discrepancy) between the closed-form analytic temperature field and the FEM output. This comparison is load-bearing for the claim that the numerical tests support the analytic model, because the FEM computations are performed on finite meshes while the analytic solution assumes an infinite domain.

Authors: We agree that a quantitative comparison between the analytic solution and the FEM results would strengthen the validation of the forward model. In the revised version of the manuscript, we will add an error analysis section that includes L² norm discrepancies and pointwise comparisons for representative cases, confirming that the FEM approximates the analytic solution to within discretization error tolerances. revision: yes
Referee: [Model assumptions and FEM setup] Model assumptions and FEM setup: the forward model is derived under the idealization of an infinite homogeneous medium, yet the FEM tests use finite computational domains without reported boundary conditions, domain-size sensitivity studies, or tests on distributed sources or material interfaces. These omissions directly affect whether the detection algorithms can be expected to transfer to the applications listed in the abstract.

Authors: The FEM simulations were conducted on large finite domains chosen to approximate the infinite medium, with boundary conditions set to minimize reflections (e.g., Dirichlet or Neumann at distant boundaries). We acknowledge that these details were not sufficiently reported. In the revision, we will expand the numerical methods section to include explicit description of the domain size, boundary conditions employed, and a sensitivity study demonstrating negligible boundary influence for the source positions tested. The work is intentionally focused on point sources in homogeneous media as the foundational case for the analytic model and detection algorithms; while extensions to distributed sources and heterogeneous media are important for the listed applications, they fall outside the current scope and are noted as directions for future research. revision: partial

Circularity Check

0 steps flagged

Analytic forward model derived from heat equation with independent FEM validation; no circular reductions

full rationale

The paper presents an analytic point source model explicitly as a solution to the 3D heat equation for static and time-varying sources, with detection algorithms developed from this model and tested via separate FEM simulations. No quoted steps show a prediction reducing to a fitted input by construction, no self-citations are load-bearing for the central claim, and the derivation chain remains self-contained against the PDE without renaming or smuggling ansatzes. The infinite-domain assumption and lack of boundary error analysis are validation gaps, not circularity.

Axiom & Free-Parameter Ledger

0 free parameters · 1 axioms · 0 invented entities

Only the abstract is available; the ledger therefore records only the domain assumption visible in the abstract.

axioms (1)

domain assumption Temperature obeys the linear heat equation in an infinite homogeneous 3D medium.
Invoked by the claim that the model solves the heat equation.

pith-pipeline@v0.9.0 · 5604 in / 1245 out tokens · 24005 ms · 2026-05-25T13:38:32.768003+00:00 · methodology

discussion (0)

Reference graph

Works this paper leans on

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[1] [1]

Ben Lardi, C

W. Ben Lardi, C. Ibarra-Castanedo, M. Klein, A. Bendada, X. Maldague, Experimental Com- parison of Lock-in and Pulsed Thermography for the Nondestr uctive Evaluation of Aerospace Materials, Electrical and Computing Engineering Department, Univer sit Laval, Quebec City (2010)

work page 2010

[2] [2]

Marinetti, Y

S. Marinetti, Y. A. Plotnikov, W. P. Winfree, A. Braggiot ti, Pulse phase thermography for defect detection and visualization , Proc. SPIE 3586, Nondestructive Evaluation of Aging Aircraft, Airports, and Aerospace Hardware III (1999)

work page 1999

[3] [3]

N. Dalir, Exact Analytical Solution for 3D Time-Dependent Heat Condu ction in a Multi- layer Sphere with Heat Sources Using Eigenfunction Expansi on Method , Hindawi Publishing Corporation, International Scholarly Research Notices (2 014)

work page

[4] [4]

T. F. Flint, J. A. Francis, M. C. Smith, A. N. Vasileiou, Semi-analytical solutions for the transient temperature ﬁelds induced by a moving heat source in an orthogonal domain , Inter- national Journal of Thermal Sciences 123 (2018), 140 – 150

work page 2018

[5] [5]

Davoodi, A

F. Davoodi, A. Abbas Nejad, A. Shahrezaee, M. J. Maghrebi , Control parameter estimation in a semi-linear parabolic inverse problem using a high accura te method , Applied Mathematics and Computation 218 (2011), 1798 – 1804

work page 2011

[6] [6]

W. Liao, M. Dehghan, A. Mohebbi, Direct numerical method for an inverse problem of a parabolic partial diﬀerential equation , Journal of Computational and Applied Mathematics 232 (2009), 351 – 360

work page 2009

[7] [7]

J. Liu, B. W ang, Z. Liu, Determination of a source term in a heat equation , International Journal of Computer Mathematics 87(5) (2010), 969 – 975

work page 2010

[8] [8]

J. R. Cannon, Determination of an unknown heat source from overspeciﬁed b oundary data , SIAM Journal of Numerical Analysis 5(2) (1968), 275 – 286

work page 1968

[9] [9]

J. R. Cannon, D. Zachmann, Parameter determination in parabolic partial diﬀerential equa- tions from overspeciﬁed boundary data , Int. J. Engng Sci. 20(6) (1982), 779 – 788

work page 1982

[10] [10]

Cheng, L-L

W. Cheng, L-L. Zhao, C-L. Fu, Source term identiﬁcation for an axisymmetric inverse heat conduction problem, Computers and Mathematics with Applications 59 (2010), 142 – 148

work page 2010

[11] [11]

Cheng, Y-J

W. Cheng, Y-J. Ma, C-L. Fu, Identifying an unknown source term in radial heat conductio n, Inverse Problems in Science and Engineering 20(3) (2012), 335 – 349

work page 2012

[12] [12]

Dou, C-L

F-F. Dou, C-L. Fu, Determining an unknown source in the heat equation by a wavel et dual least squares method , Applied Mathematics Letters 22 (2009), 661 – 667

work page 2009

[13] [13]

Dou, Wavelet-Galerkin Method for Identifying an Unknown Source Term in a Heat Equation, Mathematical Problems in Engineering (2012)

F-F. Dou, Wavelet-Galerkin Method for Identifying an Unknown Source Term in a Heat Equation, Mathematical Problems in Engineering (2012)

work page 2012

[14] [14]

D. N. Hao, B. V. Huong, N. T. N. Oanh, P. X. Thanh, Determination of a term in the right-hand side of parabolic equations , Journal of Computational and Applied Mathematics 309(2017), 28 – 43

work page 2017

[15] [15]

W ang, K

P. W ang, K. Zheng, Reconstruction of spatial heat sources in heat conduction p roblems, Applicable Analysis 85(5)(2006), 459 – 465

work page 2006

[16] [16]

J. R. Cannon, R. E. Ewing, Determination of a Source Term in a Linear Parabolic Partial Diﬀerential Equation , Journal of Applied Mathematics and Physics 27 (1976), 393 – 401. DETECTION OF TIME-V ARYING HEAT SOURCES 23

work page 1976

[17] [17]

J. R. Cannon, S. Perez-Esteva, An inverse problem for the heat equation , Inverse Problems 2 (1986), 395 – 403

work page 1986

[18] [18]

J. R. Cannon, S. Perez-Esteva, Uniqueness and stability of 3D heat sources , Inverse Problems 7 (1991), 57 – 62

work page 1991

[19] [19]

Talenti, S

G. Talenti, S. Vessella, A note on an ill-posed problem for the heat equation , J. Austral. Math. Soc. (Series A) 32 (1982), 358 – 368

work page 1982

[20] [20]

D. D. Trong, T. T. Tuyen, P. T. Nam, A. P. N Dinh, Determine the special term of a two- dimensional heat source , Applicable Analysis 88(3) (2010), 457 – 474

work page 2010

[21] [21]

Yamamoto, Conditional Stability in Determination of Force Terms of He at Equations in a Rectangle, Mathl

M. Yamamoto, Conditional Stability in Determination of Force Terms of He at Equations in a Rectangle, Mathl. Comput. Modelling 18(1) (1993), 79 – 88

work page 1993

[22] [22]

Renault, S

N. Renault, S. Andre, D. Maillet, C. Cunat, A two-step regularized inverse solution for 2-D heat source reconstruction, International Journal of Thermal Sciences 47 (2008), 834–847

work page 2008

[23] [23]

Renault, S

N. Renault, S. Andre, D. Maillet, C. Cunat, A spectral method for the estimation of a ther- momechanical heat source from infrared temperature measur ements, International Journal of Thermal Sciences 49 (2010), 1394–1406

work page 2010

[24] [24]

Y. X. Zhang, C. L. Fu, Y. J. Ma, An a posteriori parameter choice rule for the truncation regularization method for solving backward parabolic prob lems, Journal of Computational and Applied Mathematics 255 (2014), 150 – 160

work page 2014

[25] [25]

Anbar, L

M. Anbar, L. Milescu, A. Naumov, C. Brown, T. Button, C. C arty, K. AlDulaimi, Detection of Cancerous Breasts by Dynamic Area Telethermometry , IEEE Engineering in Medicine and Biology 20(5) (2001), 80–91

work page 2001

[26] [26]

T. M. Button, H. Li, P. Fisher, R. Rosenblatt, K. Dulaimy , S. Li, B. O’Hea, M. Salvitti, V. Geronimo, C. Geronimo, S. Jambawalikar, P. Carvelli, R. W eiss, Dynamic infrared imaging for the detection of malignancy , Phys. Med. Biol. 49 (2004), 3105–3116

work page 2004

[27] [27]

Joro, A.-L

R. Joro, A.-L. L¨ a¨ aperi, P. Dastidar, S. Soimakallio,T. Kuukasj¨ arvi, T. Toivonen, R. Saaristo, R. J¨ arvenp¨ a¨ a,Imaging of breast cancer with mid- and long-wave infrared ca mera, Journal of Medical Engineering & Technology 32(3) (2008), 189–197

work page 2008

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