Dynamics of complex-valued fractional-order neural networks E Kaslik, IR Rădulescu Neural Networks 89, 39-49, 2017 | 61 | 2017 |
Existence and stability of limit cycles in a two-delays model of hematopoiesis including asymmetric division A Halanay, D Cāndea, IR Rădulescu Mathematical Modelling of Natural Phenomena 9 (1), 58-78, 2014 | 32 | 2014 |
A study on stability and medical implications for a complex delay model for CML with cell competition and treatment IR Rădulescu, D Candea, A Halanay Journal of theoretical biology 363, 30-40, 2014 | 26 | 2014 |
Berwald-moor metrics and structural stability of conformally-deformed geodesic SODE. V Balan, IR Nicola APPS. Applied Sciences 11, 19-34, 2009 | 26 | 2009 |
Stability and bifurcations in fractional-order gene regulatory networks E Kaslik, IR Rădulescu Applied Mathematics and Computation 421, 126916, 2022 | 25 | 2022 |
Optimal control analysis of a leukemia model under imatinib treatment IR Rădulescu, D Candea, A Halanay Mathematics and computers in Simulation 121, 1-11, 2016 | 24 | 2016 |
Jacobi stability for geometric dynamics C Udrişte, IR Nicola Journal of Dynamical Systems and Geometric Theories 5 (1), 85-95, 2007 | 23 | 2007 |
Stability and bifurcation in a model for the dynamics of stem-like cells in leukemia under treatment IR Rǎdulescu, D Cāndea, A Halanay 9th International Conference on Mathematical Problems in Engineering …, 2012 | 22 | 2012 |
Stability analysis of equilibria in a delay differentialequations model of CML including asymmetric division and treatment A Halanay, D Cāndea, IR Rădulescu Mathematics and Computers in Simulation 110, 69-82, 2015 | 14 | 2015 |
A Lyapunov-Krasovskii functional for a complex system of delay-differential equations I Badralexi, A Halanay, IR Radulescu Politeh. Buch. Ser. A 77 (2), 9-18, 2015 | 12 | 2015 |
Geometric dynamics of calcium oscillations ODEs systems M Neagu, IR Nicola Balkan Journal of Geometry and Its Applications 9 (2), 36-67, 2004 | 11 | 2004 |
Linear and structural stability of a cell division process model V Balan, IR Nicola International journal of mathematics and mathematical sciences 2006 (1), 051848, 2006 | 10 | 2006 |
Versal deformation and static bifurcation diagrams for the cancer cell population model V Balan, I Nicola Quarterly of applied mathematics 67 (4), 755-770, 2009 | 9 | 2009 |
A complex mathematical model with competition in leukemia with immune response-an optimal control approach IR Rădulescu, D Cāndea, A Halanay System Modeling and Optimization: 27th IFIP TC 7 Conference, CSMO 2015 …, 2016 | 8 | 2016 |
A control delay differential equations model of evolution of normal and leukemic cell populations under treatment IR Rădulescu, D Cāndea, A Halanay System Modeling and Optimization: 26th IFIP TC 7 Conference, CSMO 2013 …, 2014 | 8 | 2014 |
Jacobi stability of linearized geometric dynamics C Udrişte, IR Nicola Journal of Dynamical Systems and Geometric Theories 7 (2), 161-173, 2009 | 6 | 2009 |
Linear stability and Hopf bifurcations for timedelayed intra-cell calcium variation models C Udriste, V Balan, IR Nicola Proc. of the 3-rd International Colloquium” Mathematics in Engineering and …, 2004 | 6 | 2004 |
Jacobi stability for dynamical systems with applications to biology IR Nicola, V Balan Proc. of the 3-rd International Colloquium” Mathematics in Engineering and …, 2004 | 6 | 2004 |
A COMPLEX MODEL OF CELL EVOLUTION IN LEUKEMIA INCLUDING COMPETITION AND THE ACTION OF THE IMMUNE SYSTEM. I Badralexi, S Balea, A Halanay, D Jardan, R Rădulescu Annals: Series on Mathematics & its Applications 12, 2020 | 5 | 2020 |
On n-ary operations and their applications. AM Gal'mak, V Balan, GN Vorobiev, IR Nicola Applied Sciences 13, 2011 | 5 | 2011 |