Dr. Munish Kansal currently working as an Assistant Professor in the School of Mathematics, Thapar Institute of Engineering & Technology, Patiala. He joined the department in July 2018 after completing his doctorate from Department of Mathematics, Panjab University, Chandigarh. His area of research is concerned with the development and analysis of higher-order multipoint iterative methods for solving nonlinear models and their basins of attractions. He has presented his research work a various international and national conferences. His research articles are published in journals of international repute. He has taught various under-graduate and post-graduate courses namely Mathematics-I,II,III, Linear Algebra, Operations Research and Numerical Analysis, Basic Introduction to Matlab.
Main publications:
Ioannis K. Argyros, Munish Kansal, V. Kanwar, Sugandha Bajaj, “Higher-order derivative-free families of Chebyshev-Halley type methods with or without memory for solving nonlinear equations”, Applied Mathematics and Computation, 315 (2017), 224-245
Munish Kansal, Ramandeep Behl, Mohammed Ali A. Mahnashi, Fouad Othman Mallawi, “Modified Optimal Class of Newton-Like Fourth-Order Methods for Multiple Roots”, https://doi.org/10.3390/sym11040526, Symmetry, 11:4 (2019), 526
Munish Kansal, V. Kanwar and Saurabh Bhatia, “Efficient derivative-free variants of Hansen-Patricks family with memory for solving nonlinear equations,”, https://doi.org/10.3390/sym11040526, Numerical Algorithms, 73 (2016), 1017-1036
Alicia Cordero, Munish Kansal, V. Kanwar and Juan R. Torregrosa, “A stable class of improved second-derivative free Chebyshev-Halley type methods with optimal eighth order convergence”, Numerical Algorithms, 72 (2016), 937-958
Munish Kansal, V. Kanwar and Saurabh Bhatia, “New modifications of Hansen- Patricks family with optimal fourth and eighth orders of convergence”, Applied Mathematics and Computation, 269 (2015), 507-519
M. Kansal, V. Kanwar, S. Bhatia, “Optimized mean based second derivative-free families of Chebyshev–Halley type methods”, Sib. Zh. Vychisl. Mat., 19:2 (2016), 167–181; Num. Anal. Appl., 9:2 (2016), 129–140