Asymptotic formulas for perturbations in the electromagnetic fields due to the presence of inhomogeneities of small diameter II. The full Maxwell equations H Ammari, MS Vogelius, D Volkov Journal de mathématiques pures et appliquées 80 (8), 769-814, 2001 | 222 | 2001 |
Asymptotic formulas for perturbations in the electromagnetic fields due to the presence of inhomogeneities of small diameter MS Vogelius, D Volkov ESAIM: Mathematical Modelling and Numerical Analysis 34 (4), 723-748, 2000 | 202 | 2000 |
Target detection and characterization from electromagnetic induction data H Ammari, J Chen, Z Chen, J Garnier, D Volkov Journal de mathématiques pures et appliquées 101 (1), 54-75, 2014 | 69 | 2014 |
Detection and classification from electromagnetic induction data HW Habib Ammari, Junqing Chen, Zhiming Chen, Darko Volkov Journal of Computational Physics 301, 201–217, 2015 | 48 | 2015 |
Guided modes in periodic slabs: existence and nonexistence S Shipman, D Volkov SIAM Journal on Applied Mathematics 67 (3), 687-713, 2007 | 42 | 2007 |
Numerical methods for locating small dielectric inhomogeneities D Volkov Wave Motion 38 (3), 189-206, 2003 | 34 | 2003 |
Spreading speed and travelling wave solutions of a partially sedentary population D Volkov, R Lui IMA journal of applied mathematics 72 (6), 801-816, 2007 | 32 | 2007 |
The leading-order term in the asymptotic expansion of the scattering amplitude of a collection of finite number of dielectric inhomogeneities of small diameter H Ammari, D Volkov International Journal for Multiscale Computational Engineering 3 (3), 2005 | 31 | 2005 |
Asymptotic formulas for perturbations in the eigenfrequencies of the full Maxwell equations due to the presence of imperfections of small diameter H Ammari, D Volkov Asymptotic Analysis 30 (3-4), 331-350, 2002 | 27 | 2002 |
An inverse problem for the time harmonic Maxwell's equations D Volkov Rutgers The State University of New Jersey, School of Graduate Studies, 2001 | 25 | 2001 |
Earth surface effects on active faults: An eigenvalue asymptotic analysis IR Ionescu, D Volkov Journal of computational and applied mathematics 220 (1-2), 143-162, 2008 | 18 | 2008 |
Reconstruction of faults in elastic half space from surface measurements D Volkov, C Voisin, I Ionescu Inverse Problems 33 (5), 2017 | 15 | 2017 |
An all-frequency weakly-singular surface integral equation for electromagnetism in dielectric media: Reformulation and well-posedness analysis M Ganesh, SC Hawkins, D Volkov Journal of Mathematical Analysis and Applications 412 (1), 277-300, 2014 | 13 | 2014 |
A double layer surface traction free Green's tensor D Volkov SIAM Journal on Applied Mathematics 69 (5), 1438-1456, 2009 | 13 | 2009 |
An inverse problem for the recovery of active faults from surface observations IR Ionescu, D Volkov Inverse problems 22 (6), 2103, 2006 | 13 | 2006 |
Correction of order three for the expansion of two dimensional electromagnetic fields perturbed by the presence of inhomogeneities of small diameter H Ammari, D Volkov Journal of Computational Physics 189 (2), 371-389, 2003 | 13 | 2003 |
Asymptotic formulas for thermography based recovery of anomalies H Ammari, A Kozhemyak, D Volkov Numer. Math.: TMA 2, 18-42, 2009 | 12 | 2009 |
Accurate and efficient boundary integral methods for electrified liquid bridge problems D Volkov, DT Papageorgiou, PG Petropoulos SIAM Journal on Scientific Computing 26 (6), 2102-2132, 2005 | 12 | 2005 |
An efficient algorithm for a class of stochastic forward and inverse Maxwell models in R3 M Ganesh, SC Hawkins, D Volkov Journal of Computational Physics 398, 108881, 2019 | 11 | 2019 |
Stability estimates for the fault inverse problem F Triki, D Volkov Inverse Problems 35 (7), 2019 | 10 | 2019 |