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Neural metamodels and transfer learning for induction heating processes (TEAM 36 problem)

Neural metamodels and transfer learning for induction heating processes (TEAM 36 problem)
Neural metamodels and transfer learning for induction heating processes (TEAM 36 problem)

The authors explore the possibility of applying a convolutional Naeural Network (CNN) to the solution of coupled electromagnetic and thermal problem, focusing on the classical problem of induction heating systems, traditionally solved by resorting to Finite Element (FE) models. In fact, FE modelling is widely used in the design of induction heating systems due its accuracy, even if the solution of a coupled nonlinear problem is expensive in terms of computational time and hardware resources, notably in 3D analysis. A model based on CNN could be an interesting alternative; in fact, CNN is a learning model selected for its excellent ability to converge, even when trained with a limited dataset. CNNs are able to treat images as input and they are used here as follows: given a temperature map in the workpiece, identify the corresponding vector of current, frequency and process heating time; this mapping is a model of the inverse induction heating problem. Specifically, we consider as an example the induction heating of a cylindrical steel billet, made of C45 steel, placed in a solenoidal inductor coil exhibiting the same axial length of the billet (TEAM 36 problem). A thorough heating process is usually applied before hot working of the billet, as in an extrusion process, but this methodology can be applied also in the design of induction hardening processes. First, a CNN has been trained from scratch by means of a dataset of FE solutions of coupled electromagnetic and thermal problems. For the sake of a comparison, a transfer learning technique is applied using GoogLeNet, i.e. a Deep Convolutional Neural Network able to classify images: starting from the pre-trained GoogLeNet, its training has been subsequently refined with the dataset of solutions from FE analyses. When the training dataset contains a limited number of samples, GoogleNet shows good accuracy in predicting the process parameters; in the case of a high number of samples in the training set, namely beyond a threshold like e.g. 1500, both CNNs show good accuracy of the result.

coupled fields, finite-element analysis, induction heating, neural network, Numerical modelling
1383-5416
389-398
Barba, Paolo Di
e618834b-ff8e-49e0-92b3-07a2cfe363dd
Dughiero, Fabrizio
71bc53a2-3094-46d0-93e9-dea9296222c7
Forzan, Michele
f6ed6bc9-06f0-48ed-8b67-59e4f0e3e8f4
Lowther, David A.
0cf19bca-4eac-4b03-a916-fe9b5df0dfc0
Marconi, Antonio
9d19e4b4-bc72-4683-9893-4dc64b1e3ac7
Mognaschi, Maria Evelina
0f533d8a-43ad-46b9-90b2-94e8ef1214b0
Sykulski, Jan K.
d6885caf-aaed-4d12-9ef3-46c4c3bbd7fb
Barba, Paolo Di
e618834b-ff8e-49e0-92b3-07a2cfe363dd
Dughiero, Fabrizio
71bc53a2-3094-46d0-93e9-dea9296222c7
Forzan, Michele
f6ed6bc9-06f0-48ed-8b67-59e4f0e3e8f4
Lowther, David A.
0cf19bca-4eac-4b03-a916-fe9b5df0dfc0
Marconi, Antonio
9d19e4b4-bc72-4683-9893-4dc64b1e3ac7
Mognaschi, Maria Evelina
0f533d8a-43ad-46b9-90b2-94e8ef1214b0
Sykulski, Jan K.
d6885caf-aaed-4d12-9ef3-46c4c3bbd7fb

Barba, Paolo Di, Dughiero, Fabrizio, Forzan, Michele, Lowther, David A., Marconi, Antonio, Mognaschi, Maria Evelina and Sykulski, Jan K. (2023) Neural metamodels and transfer learning for induction heating processes (TEAM 36 problem). International Journal of Applied Electromagnetics and Mechanics, 73 (4), 389-398. (doi:10.3233/JAE-230087).

Record type: Article

Abstract

The authors explore the possibility of applying a convolutional Naeural Network (CNN) to the solution of coupled electromagnetic and thermal problem, focusing on the classical problem of induction heating systems, traditionally solved by resorting to Finite Element (FE) models. In fact, FE modelling is widely used in the design of induction heating systems due its accuracy, even if the solution of a coupled nonlinear problem is expensive in terms of computational time and hardware resources, notably in 3D analysis. A model based on CNN could be an interesting alternative; in fact, CNN is a learning model selected for its excellent ability to converge, even when trained with a limited dataset. CNNs are able to treat images as input and they are used here as follows: given a temperature map in the workpiece, identify the corresponding vector of current, frequency and process heating time; this mapping is a model of the inverse induction heating problem. Specifically, we consider as an example the induction heating of a cylindrical steel billet, made of C45 steel, placed in a solenoidal inductor coil exhibiting the same axial length of the billet (TEAM 36 problem). A thorough heating process is usually applied before hot working of the billet, as in an extrusion process, but this methodology can be applied also in the design of induction hardening processes. First, a CNN has been trained from scratch by means of a dataset of FE solutions of coupled electromagnetic and thermal problems. For the sake of a comparison, a transfer learning technique is applied using GoogLeNet, i.e. a Deep Convolutional Neural Network able to classify images: starting from the pre-trained GoogLeNet, its training has been subsequently refined with the dataset of solutions from FE analyses. When the training dataset contains a limited number of samples, GoogleNet shows good accuracy in predicting the process parameters; in the case of a high number of samples in the training set, namely beyond a threshold like e.g. 1500, both CNNs show good accuracy of the result.

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More information

Published date: 14 December 2023
Keywords: coupled fields, finite-element analysis, induction heating, neural network, Numerical modelling

Identifiers

Local EPrints ID: 486006
URI: http://eprints.soton.ac.uk/id/eprint/486006
ISSN: 1383-5416
PURE UUID: 3ce4c55e-e861-47b2-9f04-9b9e5a79f951
ORCID for Jan K. Sykulski: ORCID iD orcid.org/0000-0001-6392-126X

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Date deposited: 05 Jan 2024 17:46
Last modified: 18 Mar 2024 02:32

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Contributors

Author: Paolo Di Barba
Author: Fabrizio Dughiero
Author: Michele Forzan
Author: David A. Lowther
Author: Antonio Marconi
Author: Maria Evelina Mognaschi
Author: Jan K. Sykulski ORCID iD

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