Viability, invariance and applications O Cârja, M Necula, II Vrabie Elsevier, 2007 | 150 | 2007 |
Some new viability results for semilinear differential inclusions O Cârjă, II Vrabie Nonlinear Differential Equations and Applications NoDEA 4 (3), 401-424, 1997 | 56 | 1997 |
The Characteristic Method for a First Order Partial Differential Equation O Cârjă, C Ursescu Sem., Univ., 1991 | 56 | 1991 |
Necessary and sufficient conditions for viability for semilinear differential inclusions O Cârjă, M Necula, I Vrabie Transactions of the American Mathematical Society 361 (1), 343-390, 2009 | 37 | 2009 |
The minimal time function in infinite dimensions O Cârj a ˇ SIAM journal on control and optimization 31 (5), 1103-1114, 1993 | 36 | 1993 |
On constraint controllability of linear systems in Banach spaces O Carja Journal of optimization theory and applications 56, 215-225, 1988 | 33 | 1988 |
Viability for nonautonomous semilinear differential equations O Cârjă, MDPM Marques Journal of Differential Equations 166 (2), 328-346, 2000 | 31 | 2000 |
On the existence, uniqueness and regularity of solutions to the phase-field system with a general regular potential and a general class of nonlinear and non-homogeneous … O Cârjă, A Miranville, C Moroşanu Nonlinear Analysis: Theory, Methods & Applications 113, 190-208, 2015 | 30 | 2015 |
On the Bellman equation for the minimum time problem in infinite dimensions P Cannarsa, C Ovidiu SIAM Journal of Control and Optimization, 2004 | 28 | 2004 |
On the minimal time function for distributed control systems in Banach spaces O Cârja Journal of optimization theory and applications 44, 397-406, 1984 | 26 | 1984 |
Necessary and sufficient conditions for viability for nonlinear evolution inclusions O Cârjă, M Necula, II Vrabie Set-Valued Analysis 16 (5), 701-731, 2008 | 25 | 2008 |
Weak tangency, weak invariance, and Carathéodory mappings O Cârjă, MDP Monteiro Marques Journal of dynamical and control systems 8, 445-461, 2002 | 22 | 2002 |
Characterization of Lyapunov pairs in the nonlinear case and applications O Cârjă, D Motreanu Nonlinear Analysis: Theory, Methods & Applications 70 (1), 352-363, 2009 | 19 | 2009 |
Viable domains for differential equations governed by Carathéodory perturbations of nonlinear m-accretive operators O Carja, II Vrabie LECTURE NOTES IN PURE AND APPLIED MATHEMATICS, 109-130, 2002 | 18 | 2002 |
On the minimum time function and the minimum energy problem; a nonlinear case O Cârjă Systems & control letters 55 (7), 543-548, 2006 | 16 | 2006 |
Differential equations on closed sets O Crjă, II Vrabie Handbook of Differential Equations: Ordinary Differential Equations 2, 147-238, 2006 | 14 | 2006 |
Flow-invariance and Lyapunov pairs O Carja, D Motreanu DYNAMICS OF CONTINUOUS DISCRETE AND IMPULSIVE SYSTEMS-SERIES A-MATHEMATICAL …, 2006 | 13 | 2006 |
Viability results for nonlinear perturbed differential inclusions O Carja, II Vrabie PanAmerican Mathematical Journal 9, 63-74, 1999 | 13 | 1999 |
Viability of fractional differential inclusions O Carja, T Donchev, M Rafaqat, R Ahmed Applied Mathematics Letters 38, 48-51, 2014 | 12 | 2014 |
Fast controls and minimum time D Azé, O Cârja Control and Cybernetics 29 (4), 887-894, 2000 | 12 | 2000 |