A note on the global stability of generalized difference equations E Liz, JB Ferreiro Applied Mathematics Letters 15 (6), 655-659, 2002 | 113 | 2002 |
A global stability criterion for scalar functional differential equations E Liz, V Tkachenko, S Trofimchuk SIAM Journal on Mathematical Analysis 35 (3), 596-622, 2003 | 102 | 2003 |
Halanay inequality, Yorke 3/2 stability criterion, and differential equations with maxima A Ivanov, E Liz, S Trofimchuk Tohoku Mathematical Journal, Second Series 54 (2), 277-295, 2002 | 96 | 2002 |
Periodic boundary value problems for a class of functional differential equations E Liz, JJ Nieto Journal of mathematical analysis and applications 200 (3), 680-686, 1996 | 90 | 1996 |
Global behaviour of a second-order nonlinear difference equation I Bajo, E Liz Journal of Difference Equations and Applications 17 (10), 1471-1486, 2011 | 88 | 2011 |
Periodic boundary value problem for first order differential equations with impulses at variable times I Bajo, E Liz Journal of mathematical analysis and applications 204 (1), 65-73, 1996 | 85 | 1996 |
The hydra effect, bubbles, and chaos in a simple discrete population model with constant effort harvesting E Liz, A Ruiz-Herrera Journal of mathematical biology 65, 997-1016, 2012 | 71 | 2012 |
Global dynamics in a stage-structured discrete-time population model with harvesting E Liz, P Pilarczyk Journal of Theoretical Biology 297, 148-165, 2012 | 70 | 2012 |
A global stability criterion for a family of delayed population models E Liz, M Pinto, V Tkachenko, S Trofimchuk Quarterly of applied mathematics 63 (1), 56-70, 2005 | 70 | 2005 |
Local stability implies global stability in some one-dimensional discrete single-species models E Liz Discrete And Continuous Dynamical Systems Series b 7 (1), 191, 2007 | 67 | 2007 |
A contribution to the study of functional differential equations with impulses D Franco, E Liz, JJ Nieto, YV Rogovchenko Mathematische Nachrichten 218 (1), 49-60, 2000 | 63 | 2000 |
Sufficient conditions for the global stability of nonautonomous higher order difference equations L Berezansky, E Braverman, E Liz Journal of Difference Equations and Applications 11 (9), 785-798, 2005 | 59 | 2005 |
How to control chaotic behaviour and population size with proportional feedback E Liz Physics Letters A 374 (5), 725-728, 2010 | 57 | 2010 |
On the global attractor of delay differential equations with unimodal feedback E Liz, G Röst Discrete Contin. Dynam. Syst. A 24 (4), 1215-1224, 2009 | 55 | 2009 |
Harvest timing and its population dynamic consequences in a discrete single-species model B Cid, FM Hilker, E Liz Mathematical biosciences 248, 78-87, 2014 | 54 | 2014 |
Discrete Halanay-type inequalities and applications E Liz, A Ivanov, JB Ferreiro Nonlinear Analysis: Theory, Methods & Applications 55 (6), 669-678, 2003 | 53 | 2003 |
Boundary value problems for higher order ordinary differential equations with impulses A Cabada, E Liz Nonlinear analysis 32 (6), 775-786, 1998 | 51 | 1998 |
Global stability in discrete population models with delayed-density dependence E Liz, V Tkachenko, S Trofımchuk Mathematical Biosciences 199 (1), 26-37, 2006 | 50 | 2006 |
Wright type delay differential equations with negative Schwarzian E Liz, M Pinto, G Robledo, V Tkachenko, S Trofimchuk Discrete Contin. Dynam. Syst. 9 (2), 309-321, 2003 | 50 | 2003 |
Convergence to equilibria in discrete population models HA El-Morshedy, E Liz Journal of Difference Equations and Applications 11 (2), 117-131, 2005 | 48 | 2005 |