Parameter uniform numerical method for singularly perturbed turning point problems exhibiting boundary layers S Natesan, J Jayakumar, J Vigo-Aguiar Journal of Computational and Applied Mathematics 158, 121-134, 2003 | 76 | 2003 |
A numerical method for singular perturbation problems arising in chemical reactor theory J Jayakumar, N Ramanujam Computers & Mathematics with Applications 27 (5), 83-99, 1994 | 35 | 1994 |
A computational method for solving singular perturbation problems J Jayakumar, N Ramanujam Applied Mathematics and Computation 55 (1), 31-48, 1993 | 30 | 1993 |
Some Higher Order Newton-Like Methods for Solving System of Nonlinear Equations and Its Applications M Kalyanasundaram, J Jayakumar International Journal of Applied and Computational Mathematics 3 (3), 2213–2230, 2017 | 26 | 2017 |
An improvement to double-step Newton method and its multi-step version for solving system of nonlinear equations and its applications M Kalyanasundaram, DKR Babajee, J Jayakumar Numerical Algorithms 74 (2), 593–607, 2017 | 24 | 2017 |
On Some Improved Harmonic Mean Newton-Like Methods for Solving Systems of Nonlinear Equations B Diyashvir Kreetee Rajiv, M Kalyanasundaram, J Jayakumar Algorithms 8 (4), 895-909, 2015 | 22 | 2015 |
Higher Order Methods for Nonlinear Equations and Their Basins of Attraction M Kalyanasundaram, J Jayakumar Mathematics 4 (2), 22, 2016 | 16 | 2016 |
Some New Higher Order Weighted Newton Methods for Solving Nonlinear Equation with Applications S Parimala, J Jayakumar Mathematical and Compuational Applications 24 (00059), 10.3390/mca24020059, 2019 | 15* | 2019 |
Modified Newton's method using harmonic mean for solving nonlinear equations J Jayakumar, M Kalyanasundaram IOSR Journal of Mathematics 7 (4), 93-97, 2013 | 15 | 2013 |
A family of higher order multi-point iterative methods based on power mean for solving nonlinear equations B Diyashvir Kreetee Rajiv, M Kalyanasundaram, J Jayakumar Afrika Matematika 27 (5-6), 865–876, 2016 | 14 | 2016 |
Improvement of numerical solution by boundary value technique for singularly perturbed one dimensional reaction diffusion problem J Jayakumar Applied Mathematics and Computation 142, 417-447, 2003 | 12 | 2003 |
Optimal fourth order methods with its multi-step version for nonlinear equation and their Basins of attraction S Parimala, M Kalyanasundaram, J Jayakumar SeMA Journal 76 (4), 559-579, 2019 | 10 | 2019 |
Generalized Power means Modification of Newton’s Method for Simple Roots of Nonlinear Equation J Jayakumar, M Kalyanasundaram International Journal of Pure and Applied Sciences and Technology 18 (2), 45-51, 2013 | 10 | 2013 |
Generalised Simpson-Newton’s method for solving nonlinear equations with cubic convergence J Jayakumar IOSR journal of Mathematics 7 (5), 58-61, 2013 | 10 | 2013 |
Optimal Eighth And Sixteenth Order Iterative Methods For Solving Nonlinear Equation With Basins Of Attraction S Parimala, M Kalyanasundaram, J Jayakumar Applied Mathematics E-Notes 21, 320-343, 2021 | 8 | 2021 |
Local Convergence of an Optimal Method of Order Four for Solving Non-Linear System JA John, J Jayakumar, IK Argyros International Journal of Applied and Computational Mathematics 8 (4), 194, 2022 | 7 | 2022 |
Power means based modification of Newton’s method for solving nonlinear equations with cubic convergence J Jayakumar, M Kalyanasundaram International Journal of Applied Mathematics and Computation 6 (2), 1-6, 2015 | 7 | 2015 |
A Computational Method for Solving Quasilinear Singular Perturbation Problems J Jayakumar, N Ramanujam Applied Mathematics and Computation 71, 1-14, 1995 | 7 | 1995 |
Efficient Two-Step Fifth-Order and Its Higher-Order Algorithms for Solving Nonlinear Systems with Applications S Parimala, J Jayakumar Axioms 8 (2), doi:10.3390/axioms8020037, 2019 | 5* | 2019 |
A New Class of Optimal Eighth Order Method with Two Weight Functions for Solving Nonlinear Equation S Parimala, M Kalyanasundaram, J Jayakumar Journal of Nonlinear Analysis and Application 2018 (2), 83-94, 2018 | 5 | 2018 |