References
- Trans. Amer. Math. Soc. v.347 Local uniqueness in the inverse problem with one measurement G, Alessandrini, V.;Isakov;J. Powell
- SIAM J. Appl. Math. v.58 The inverse conductivity problem with one measurement: bounds on the size of the unknown object G, Alessandrini;E. Rosset
- Proc. Amer. Math. Soc. v.128 Optimal size estimates for the inverse conductivity problem with one measurement G. Alessandrini;E. Rosset;J.K. Seo
- Arch. Rat. Mech. Anal. v.101 Identification problem in potential theory H, Bellout;A. Friedman
- Trans. Amer. Math. Soc. v.332 Inverse problem in potential theory H. Bellout;A. Friedman;V. Isakov
- Inverse Problems v.16 Numerical implementation of two non-interative methods for locating inclusions by impedance tomography M. Bruhl;M. Hanke
- Inverse Problems v.7 Numerical recovery of certain discontinuous electrical conductivities K. Brayan
- Inverse Problems v.14 Identification of conductivity imperfections of small parameter by boundary measurements. Continuous dependence and computational reconstruction D.J. Cedio-Fengya;S. Moskow;M. Vogelius
- SIAM Review v.41 Electrical impedance tomography M. Cheney;D. Isaacson;J.C. Newell
- SIAM J. of Math. Anal. v.30 Inverse conductivity problem: error estimates and approximate identification for perturbed disks E. Fabes;H. Kang;J.K. Seo
- Indiana Univ. Math. J. v.38 On the nuiqueness in the inverse conductivity problem with one measurement A. Friedman;V. Isakov
- Arch. Rat. Mech. Anal. v.105 Identification of small inhomogeneities of extreme conductivity by boundary measuremetns: a theorem on continuous dependence A. Friedman;M. Vogelius
- Inverse Problems v.14 The determination of a discontinuity in a conductivity from a single boundary measurement F. Hettlich;W. Rundell
- Clin. Phys. Physiol. Meas. v.9 A regularized electrical impedance tomography reconstruction algorithm P. Hua;W. Tompkins;J. Webster
- IEEE Trans. Medical Imaging Distinguishability of conductivities by electric current computed tomogtaphy D. Isaacson
- Inverse Problems v.12 Layer potential technique for the inverse conductivity problem H. Kang;J.K. Seo
- SIAM J. Appl. Math. v.59 Inverse conductivity problem with one measurement: uniqueness for balls in R³
- SIAM J. of Math. Anal. v.28 Inverse conductivity problem with one measurement: Stability and estimations of size H. Kang;J. K. Seo;D. Sheen
- Inverse Problems v.17 Total size estimation and identification of multiple anomalies in the inverse electrical impdeance tomography O. Kwon;J.K. Seo
- A real time algorithm for the location search of discontinuous concuctivites with one measurement O. Kwon;J.K. Seo;J.R. Yoon
- Inverse conductivity problem: Local search method for multiple anomalies