Articles | Volume 6, issue 2
J. Sens. Sens. Syst., 6, 269–284, 2017
J. Sens. Sens. Syst., 6, 269–284, 2017

Regular research article 16 Aug 2017

Regular research article | 16 Aug 2017

Accelerated optimizations of an electromagnetic acoustic transducer with artificial neural networks as metamodels

Shen Wang1, Songling Huang1, Qing Wang2, Lisha Peng1, and Wei Zhao1 Shen Wang et al.
  • 1State Key Lab. of Power System, Dept. of Electrical Engineering, Tsinghua University, Beijing 100084, China
  • 2School of Engineering and Computing Sciences, Durham University, DH1 3LE, Durham, UK

Abstract. Electromagnetic acoustic transducers (EMATs) are noncontact transducers generating ultrasonic waves directly in the conductive sample. Despite the advantages, their transduction efficiencies are relatively low, so it is imperative to build accurate multiphysics models of EMATs and optimize the structural parameters accordingly, using a suitable optimization algorithm. The optimizing process often involves a large number of runs of the computationally expensive numerical models, so metamodels as substitutes for the real numerical models are helpful for the optimizations. In this work the focus is on the artificial neural networks as the metamodels of an omnidirectional EMAT, including the multilayer feedforward networks trained with the basic and improved back propagation algorithms and the radial basis function networks with exact and nonexact interpolations. The developed neural-network programs are tested on an example problem. Then the model of an omnidirectional EMAT generating Lamb waves in a linearized steel plate is introduced, and various approaches to calculate the amplitudes of the displacement component waveforms are discussed. The neural-network metamodels are then built for the EMAT model and compared to the displacement component amplitude (or ratio of amplitudes) surface data on a discrete grid of the design variables as the reference, applying a multifrequency model with FFT (fast Fourier transform)/IFFT (inverse FFT) processing. Finally the two-objective optimization problem is formulated with one objective function minimizing the ratio of the amplitude of the S0-mode Lamb wave to that of the A0 mode, and the other objective function minimizing as the negative amplitude of the A0 mode. Pareto fronts in the criterion space are solved with the neural-network models and the total time consumption is greatly decreased. From the study it could be observed that the radial basis function network with exact interpolation has the best performance considering its accuracy of approximation and the time required to build the metamodel.