Fast methods for quantitative eddy-current tomography of conductive materials

In this paper, we address the imaging of the spatial distribution of the resistivity of conductive materials by using data from eddy-current nondestructive testing. Specifically, the data consists of measurements of the impedance matrix at several frequencies acquired using a coil array. The imaging method processes the second-order term (estimated from the measured data) of the power series expansion, with respect to frequency, of the impedance matrix. This term accounts for the resistive contribution to changes of the impedance matrix, due to the presence of anomalies in the conductor under test, occurring at relatively low frequencies. The operator mapping a given resistivity distribution inside the conductor into the second-order term satisfies a proper monotonicity property. The monotonicity makes it possible to apply a fast noniterative imaging method initially developed by the authors for elliptic problems such as electrical resistance tomography. Numerical examples show the main features of the proposed method, and demonstrate the possibility of real-time imaging.

[1]  Manuchehr Soleimani,et al.  A noniterative inversion method for electrical resistance, capacitance and inductance tomography for two phase materials , 2003 .

[2]  D. Lesselier,et al.  Eddy-current evaluation of three-dimensional defects in a metal plate , 2002 .

[3]  S.S. Udpa,et al.  Three-dimensional defect reconstruction from eddy-current NDE signals using a genetic local search algorithm , 2004, IEEE Transactions on Magnetics.

[4]  Takashi Ohe,et al.  A numerical method for finding the convex hull of polygonal cavities using the enclosure method , 2002 .

[5]  S. A. Jenkins,et al.  Eddy‐current probe impedance due to a volumetric flaw , 1991 .

[6]  R. Albanese,et al.  Finite Element Methods for the Solution of 3D Eddy Current Problems , 1997 .

[7]  G. Rubinacci,et al.  Shape identification of conductive anomalies by a new ECT data inversion algorithm , 2002 .

[8]  Adel Razek,et al.  Eddy current scattering and inverse scattering, Green's integral and variational formulations. , 2002 .

[9]  Zsolt Badics,et al.  Fast flaw reconstruction from 3D eddy current data , 1998 .

[10]  Kenzo Miya,et al.  Eddy-current testing by flexible microloop magnetic sensor array , 1998 .

[11]  Dominique Lesselier,et al.  Eddy current testing of anomalies in conductive materials. II. Quantitative imaging via deterministic and stochastic inversion techniques , 1992 .

[12]  G. Rubinacci,et al.  Numerical models of volumetric insulating cracks in eddy-current testing with experimental validation , 2006, IEEE Transactions on Magnetics.

[13]  Hans H. Gatzen,et al.  Eddy-current microsensor based on thin-film technology , 2002 .

[14]  E. T. WHITTAKER,et al.  Partial Differential Equations of Mathematical Physics , 1932, Nature.

[15]  R. Albanese,et al.  Treatment of multiply connected regions in two-component electric vector potentials formulations , 1990 .

[16]  R. Albanese,et al.  Integral formulation for 3D eddy-current computation using edge elements , 1988 .

[17]  C. Vogel Computational Methods for Inverse Problems , 1987 .

[18]  Andreas Kirsch,et al.  Characterization of the shape of a scattering obstacle using the spectral data of the far field operator , 1998 .

[19]  Antonello Tamburrino,et al.  A differential formulation based on a perturbative approach to solve the ECT inverse problem , 1999 .

[20]  Fabio Villone,et al.  An Integral Computational Model for Crack Simulation and Detection via Eddy Currents , 1999 .

[21]  A. Baussard,et al.  Eddy-current evaluation of three-dimensional flaws in flat conductive materials using a Bayesian approach , 2002 .

[22]  Kenzo Miya,et al.  Recent advancement of electromagnetic nondestructive inspection technology in Japan , 2002 .

[23]  J. Pávó,et al.  Reconstruction of crack shape by optimization using eddy current field measurement , 1994 .

[24]  F. A. Seiler,et al.  Numerical Recipes in C: The Art of Scientific Computing , 1989 .

[25]  Guglielmo Rubinacci,et al.  An eddy current integral formulation on parallel computer systems , 2005 .

[26]  V. Isakov Uniqueness and stability in multi-dimensional inverse problems , 1993 .

[27]  John R. Bowler Eddy current calculations using half-space Green's functions , 1989 .

[28]  Martin Brühl,et al.  Explicit Characterization of Inclusions in Electrical Impedance Tomography , 2001, SIAM J. Math. Anal..

[29]  David Colton,et al.  The uniqueness of a solution to an inverse scattering problem for electromagnetic waves , 1992 .

[30]  A. Kirsch,et al.  A simple method for solving inverse scattering problems in the resonance region , 1996 .

[31]  David Isaacson,et al.  Electric current computed tomography eigenvalues , 1990 .

[32]  John R. Bowler,et al.  Theory of eddy current inversion , 1993 .

[33]  Numerical modelling of volumetric defects , 2004 .

[34]  Antonello Tamburrino,et al.  A new non-iterative inversion method for electrical resistance tomography , 2002 .