Stability and Hopf bifurcation of a diffusive predator‐prey model with hyperbolic mortality M Sambath, K Balachandran, M Suvinthra Complexity 21 (S1), 34-43, 2016 | 39 | 2016 |
Asymptotic behavior of the fractional order three species prey–predator model M Sambath, P Ramesh, K Balachandran International Journal of Nonlinear Sciences and Numerical Simulation 19 (7-8 …, 2018 | 34 | 2018 |
Stability analysis of the fractional-order prey-predator model with infection P Ramesh, M Sambath, MH Mohd, K Balachandran International Journal of Modelling and Simulation 41 (6), 434-450, 2021 | 32 | 2021 |
Spatiotemporal patterns in a predator–prey model with cross-diffusion effect M Sambath, K Balachandran, LN Guin International Journal of Bifurcation and Chaos 28 (02), 1830004, 2018 | 30 | 2018 |
Numerical solution of fuzzy differential equations by third order Runge-Kutta method K Kanagarajan, M Sambath International Journal of Applied Mathematics and Computation 2 (4), 1-8, 2010 | 30 | 2010 |
Stability and Hopf bifurcation of a diffusive predator–prey model with predator saturation and competition M Sambath, S Gnanavel, K Balachandran Applicable Analysis 92 (12), 2439-2456, 2013 | 27 | 2013 |
Stability and Hopf bifurcation analysis of a diffusive predator–prey model with Smith growth M Sivakumar, M Sambath, K Balachandran International Journal of Biomathematics 8 (01), 1550013 [18 pages], 2015 | 24 | 2015 |
Pattern formation scenario through Turing instability in interacting reaction-diffusion systems with both refuge and nonlinear harvesting LN Guin, E Das, M Sambath Journal of Applied Nonlinear Dynamics 9 (1), 1-21, 2020 | 23 | 2020 |
Runge-Kutta Nystrom method of order three for solving fuzzy differential equations K Kanagarajan, M Sambath Computational Methods in Applied Mathematics 10 (2), 195-203, 2010 | 23 | 2010 |
Spatiotemporal dynamics of a predator-prey model incorporating a prey refuge M Sambath, K Balachandran Journal of Applied Analysis and Computation 3 (1), 71-80, 2013 | 20 | 2013 |
Analysis of Stochastic Predator‐Prey Model with Disease in the Prey and Holling Type II Functional Response C Gokila, M Sambath, K Balachandran, YK Ma Advances in Mathematical Physics 2020 (1), 3632091, 2020 | 17 | 2020 |
Laplace Adomian decomposition method for solving a fish farm model MSK Balachandran. Nonautonomous Dynamical Systems 3 (1), 104-111, 2016 | 15* | 2016 |
Bifurcations in a diffusive predator–prey model with predator saturation and competition response M Sambath, K Balachandran Mathematical Methods in the Applied Sciences 38 (8), 785-798, 2015 | 14 | 2015 |
Numerical solution of hybrid fuzzy differential equations by improved predictor-corrector method K Kanagarajan, M Sambath Nonlinear Studies 19 (2), 225-238, 2012 | 8 | 2012 |
Pattern formation for a ratio-dependent predator-prey model with cross diffusion M Sambath, K Balachandran Journal of the Korean Society for Industrial and Applied Mathematics 16 (4 …, 2012 | 8 | 2012 |
The threshold for a stochastic within-host CHIKV virus model with saturated incidence rate C Gokila, M Sambath International Journal of Biomathematics 14 (06), 2150042, 2021 | 6 | 2021 |
Hopf bifurcation and synchronisation of a fractional-order butterfly-fish chaotic system P Ramesh, M Sambath, K Balachandran Journal of Control and Decision 9 (1(2021/8/20)), 117-128, 2022 | 5 | 2022 |
Qualitative Analysis for a Phytoplankton-Zooplankton Model with Allee Effect and Holling Type II Response MS Surendar, M Sambath Discontinuity, Nonlinearity, and Complexity 10 (01), 1-18, 2021 | 5 | 2021 |
Influence of Diffusion on Bio-chemical Reaction of the Morphogenesis Process MS K. Balachandran Journal of Applied Nonlinear Dynamics 4 (2), 181–195, 2015 | 5* | 2015 |
Modeling and simulations of a Zika virus as a mosquito-borne transmitted disease with environmental fluctuations C Gokila, M Sambath International Journal of Nonlinear Sciences and Numerical Simulation 24 (1 …, 2023 | 4 | 2023 |