Set-valued optimization AA Khan, C Tammer, C Zalinescu Springer-Verlag Berlin An, 2016 | 544 | 2016 |
Nonlinear analysis and variational problems PM Pardalos, TM Rassias, AA Khan Springer New York, 2010 | 161 | 2010 |
Nonlinear quasi-hemivariational inequalities: existence and optimal control S Zeng, S Migórski, AA Khan SIAM Journal on Control and Optimization 59 (2), 1246-1274, 2021 | 111 | 2021 |
Second-order optimality conditions in set optimization J Jahn, AA Khan, P Zeilinger Journal of Optimization Theory and Applications 125, 331-347, 2005 | 111 | 2005 |
An abstract framework for elliptic inverse problems: Part 1. an output least-squares approach MS Gockenbach, AA Khan Mathematics and mechanics of solids 12 (3), 259-276, 2007 | 107 | 2007 |
On the inverse problem of identifying Lamé coefficients in linear elasticity B Jadamba, AA Khan, F Raciti Computers & Mathematics with Applications 56 (2), 431-443, 2008 | 85 | 2008 |
The antennal system and cockroach evasive behavior. I. Roles for visual and mechanosensory cues in the response S Ye, V Leung, A Khan, Y Baba, CM Comer Journal of Comparative Physiology A 189, 89-96, 2003 | 82 | 2003 |
Generalized contingent epiderivatives in set-valued optimization: optimality conditions J Jahn, AA Khan Taylor & Francis Group 23 (7-8), 807-831, 2002 | 81 | 2002 |
Beyond the 50-minute hour: increasing control, choice, and connections in the lives of low-income women. LA Goodman, KF Smyth, V Banyard American Journal of Orthopsychiatry 80 (1), 3, 2010 | 77 | 2010 |
Regularization of non-coercive quasi variational inequalities F Giannessi, A Khan Control and Cybernetics 29 (1), 91-110, 2000 | 77 | 2000 |
Inverse problems for nonlinear quasi-hemivariational inequalities with application to mixed boundary value problems S Migórski, AA Khan, S Zeng Inverse Problems 36 (2), 024006, 2020 | 68 | 2020 |
an Introduction with Applications AA Khan, C Tammer, C Zalinescu, SV Optimization Springer, Berlin, 2015 | 65 | 2015 |
Inverse problems for nonlinear quasi-variational inequalities with an application to implicit obstacle problems of p-Laplacian type S Migórski, AA Khan, S Zeng Inverse Problems 35 (3), 035004, 2019 | 61 | 2019 |
An abstract framework for elliptic inverse problems: Part 2. An augmented Lagrangian approach MS Gockenbach, AA Khan Mathematics and Mechanics of Solids 14 (6), 517-539, 2009 | 60 | 2009 |
Existence theorems for elliptic and evolutionary variational and quasi-variational inequalities AA Khan, D Motreanu Journal of Optimization Theory and Applications 167, 1136-1161, 2015 | 53 | 2015 |
Equation error approach for elliptic inverse problems with an application to the identification of Lamé parameters MS Gockenbach, B Jadamba, AA Khan Inverse Problems in Science and Engineering 16 (3), 349-367, 2008 | 53 | 2008 |
Identification of Lamé parameters in linear elasticity: a fixed point approach MS Gockenbach, AA Khan Journal of Industrial and Management Optimization 1 (4), 487-497, 2005 | 53 | 2005 |
Food and feeding habits of the spiny eel, Mastacembelus armatus M Serajuddin, AA Khan, S Mustafa Asian Fisheries Science 11, 271-278, 1998 | 53 | 1998 |
Regularization of quasi-variational inequalities AA Khan, C Tammer, C Zalinescu Optimization 64 (8), 1703-1724, 2015 | 47 | 2015 |
A new convex inversion framework for parameter identification in saddle point problems with an application to the elasticity imaging inverse problem of predicting tumor location B Jadamba, AA Khan, G Rus, M Sama, B Winkler SIAM Journal on Applied Mathematics 74 (5), 1486-1510, 2014 | 47 | 2014 |