| Carleman Estimates for Coefficient Inverse Problems and Numerical Applications MV Klibanov, AA Timonov | 535 | 2004 |
| Conductivity imaging with a single measurement of boundary and interior data A Nachman, A Tamasan, A Timonov Inverse Problems 23 (6), 2551, 2007 | 118 | 2007 |
| Recovering the conductivity from a single measurement of interior data A Nachman, A Tamasan, A Timonov Inverse Problems 25 (3), 035014, 2009 | 109 | 2009 |
| Current density impedance imaging A Nachman, A Tamasan, A Timonov Tomography and inverse transport theory 559, 135-149, 2011 | 67 | 2011 |
| Reconstruction of planar conductivities in subdomains from incomplete data A Nachman, A Tamasan, A Timonov SIAM Journal on Applied Mathematics 70 (8), 3342-3362, 2010 | 50 | 2010 |
| CMOS SOCs at 100 GHz: System architectures, device characterization, and IC design examples SP Voinigescu, ST Nicolson, M Khanpour, KKW Tang, KHK Yau, ... 2007 IEEE International Symposium on Circuits and Systems (ISCAS), 1971-1974, 2007 | 39 | 2007 |
| A convergent algorithm for the hybrid problem of reconstructing conductivity from minimal interior data A Moradifam, A Nachman, A Timonov Inverse Problems 28 (8), 084003, 2012 | 34 | 2012 |
| On the mathematical treatment of time reversal MV Klibanov, A Timonov Inverse Problems 19 (6), 1299, 2003 | 30 | 2003 |
| Numerical studies on the globally convergent convexification algorithm in 2D MV Klibanov, A Timonov Inverse Problems 23 (1), 123, 2006 | 25 | 2006 |
| A unified framework for constructing globally convergent algorithms for multidimensional coefficient inverse problems MV Klibanov, A Timonov Applicable Analysis 83 (9), 933-955, 2004 | 24 | 2004 |
| A sequential minimization algorithm based on the convexification approach MV Klibanov, A Timonov Inverse Problems 19 (2), 331, 2003 | 23 | 2003 |
| High frequency system on chip transceiver SP Voinigescu, A Timonov, ST Nicolson, A Nachman, E Laskin, ... US Patent 8,139,625, 2012 | 22 | 2012 |
| A new slant on the inverse problems of electromagnetic frequency sounding:‘convexification’of a multiextremal objective function via the Carleman weight functions MV Klibanov, A Timonov Inverse Problems 17 (6), 1865, 2001 | 16 | 2001 |
| Current density impedance imaging, Tomography and inverse transport theory, 135-149 A Nachman, A Tamasan, A Timonov Contemp. Math 559, 0 | 15 | |
| A new iterative procedure for the numerical solution of coefficient inverse problems A Timonov, MV Klibanov Applied numerical mathematics 54 (2), 280-291, 2005 | 13 | 2005 |
| Stable reconstruction of regular 1-Harmonic maps with a given trace at the boundary A Tamasan, A Timonov, J Veras Applicable Analysis 94 (6), 1098-1115, 2015 | 12 | 2015 |
| Numerical modeling of electromagnetic frequency sounding in marine environments: a comparison of local optimization techniques P Krylstedt, J Mattsson, A Timonov Proceedings of the 3rd International Conference on Marine Electromagnetics …, 2001 | 11 | 2001 |
| A globally convergent convexification algorithm for the inverse problem of electromagnetic frequency sounding in one dimension MV Klibanov, AA Timonov Numerical methods and programming 4 (1), 52-81, 2003 | 10 | 2003 |
| Global uniqueness for a 3D/2D inverse conductivity problem via the modified method of Carleman estimates. MV Klibanov, A Timonov Journal of Inverse & Ill-Posed Problems 13 (2), 2005 | 9 | 2005 |
| On a new approach to frequency sounding of layered media A Tamasan, A Timonov Numerical Functional Analysis and Optimization 29 (3-4), 470-486, 2008 | 8 | 2008 |
