Nonsmooth variational problems and their inequalities: comparison principles and applications S Carl, VK Le, D Motreanu Springer Science & Business Media, 2007 | 544 | 2007 |
Minimax theorems and qualitative properties of the solutions of hemivariational inequalities D Motreanu, PD Panagiotopoulos Springer Science & Business Media, 2013 | 448 | 2013 |
Topological and variational methods with applications to nonlinear boundary value problems D Motreanu, VV Motreanu, NS Papageorgiou Springer 1 (7), 9, 2014 | 350 | 2014 |
Variational and non-variational methods in nonlinear analysis and boundary value problems D Motreanu, VD Radulescu Springer Science & Business Media, 2013 | 266 | 2013 |
Variational and Hemivariational Inequalities: Theory, Methods, and Applications D Goeleven, D Motreanu, Y Dumont, M Rochdi Springer, 2004 | 164 | 2004 |
On a three critical points theorem for non-differentiable functions and applications to nonlinear boundary value problems SA Marano, D Motreanu Nonlinear Analysis: Theory, Methods & Applications 48 (1), 37-52, 2002 | 155 | 2002 |
Evolutionary problems driven by variational inequalities Z Liu, S Zeng, D Motreanu Journal of Differential Equations 260 (9), 6787-6799, 2016 | 145 | 2016 |
Infinitely many critical points of non-differentiable functions and applications to a Neumann-type problem involving the p-Laplacian SA Marano, D Motreanu Journal of Differential Equations 182 (1), 108-120, 2002 | 139 | 2002 |
Partial differential hemivariational inequalities Z Liu, S Zeng, D Motreanu Advances in Nonlinear Analysis 7 (4), 571-586, 2018 | 105 | 2018 |
Comparison and positive solutions for problems with the (p, q)-Laplacian and a convection term LFO Faria, OH Miyagaki, D Motreanu Proceedings of the Edinburgh Mathematical Society 57 (3), 687-698, 2014 | 105 | 2014 |
Generalized penalty and regularization method for differential variational-hemivariational inequalities Z Liu, D Motreanu, S Zeng SIAM Journal on Optimization 31 (2), 1158-1183, 2021 | 92 | 2021 |
Eigenvalue problems for variational-hemivariational inequalities at resonance D Goeleven, D Motreanu, PD Panagiotopoulos Nonlinear Analysis: Theory, Methods & Applications 33 (2), 161-180, 1998 | 86 | 1998 |
Positive solutions of quasi-linear elliptic equations with dependence on the gradient F Faraci, D Motreanu, D Puglisi Calculus of Variations and Partial Differential Equations 54 (1), 525-538, 2015 | 84 | 2015 |
Tangency, flow invariance for differential equations, and optimization problems NH Pavel, D Motreanu CRC Press, 1999 | 84 | 1999 |
Extremal solutions of quasilinear parabolic inclusions with generalized Clarke's gradient S Carl, D Motreanu Journal of Differential Equations 191 (1), 206-233, 2003 | 79 | 2003 |
Positive solutions for nonlinear singular elliptic equations of p-Laplacian type with dependence on the gradient Z Liu, D Motreanu, S Zeng Calculus of Variations and Partial Differential Equations 58 (1), 28, 2019 | 77 | 2019 |
Quasivariational inequalities and applications in frictional contact problems with normal compliance D Motreanu, M Sofonea Advances in Mathematical Sciences and Applications 10 (1), 103-118, 2000 | 75 | 2000 |
Multiple solutions for nonlinear Neumann problems driven by a nonhomogeneous differential operator D Motreanu, N Papageorgiou Proceedings of the American Mathematical Society 139 (10), 3527-3535, 2011 | 73 | 2011 |
Existence and multiplicity of solutions for Neumann problems D Motreanu, NS Papageorgiou Journal of Differential Equations 232 (1), 1-35, 2007 | 72 | 2007 |
Constant-sign and sign-changing solutions for nonlinear eigenvalue problems S Carl, D Motreanu Nonlinear Analysis: Theory, Methods & Applications 68 (9), 2668-2676, 2008 | 66 | 2008 |