Dr. Muhammed Saeed K
Dr. Muhammed Saeed K
Ad-hoc Faculty in Mathematics
Office Address:
Department of Mathematics, NIT Calicut, Kozhikode 673601
Home Address:
Muttayil thodi house, Chenakkalangadi PO Malappuram, Kerala PIN: 673636
Journals
1. Saeed K,M., Remesh, K., George, S., Padikkal, J, and Argyros, I. K. (2023). Local
Convergence of Traub’s Method and Its Extensions. Fractal Fract., 7(1),98.
https://doi.org/10.3390/fractalfract7010098
2. Remesh, K., Argyros, I. K., Saeed K, M., George, S., and Padikkal, J. (2022). Extending the
Applicability of Cordero Type Iterative Method. Symmetry, 14(12), 2495.
https://doi.org/10.3390/sym14122495 .
3. Krishnendu, R., Saeed, M., George, S., and Jidesh, P. (2022). On Newton’s Midpoint-Type
Iterative Scheme’s Convergence. International Journal of Applied and Computational
Mathematics, 8(5), 1-11. https://doi.org/10.1007/s40819-022-01468-1 .
4. Muhammed Saeed, K., Krishnendu, R., George, S., and Padikkal, J. (2022). On the
convergence of Homeier method and its extensions. The Journal of Analysis, 1-12
https://10.1007/s41478-022-00449-3 .
5. George, S., Saeed, M., Argyros, I.K. and P.Jidesh (2022). An apriori parameter choice strategy
and a fifth order iterative scheme for Lavrentiev regularization method. AJ. Appl. Math. Comput.
https://doi.org/10.1007/s12190-022-01782-3
6. S. George, I.K. Argyros, P. Jidesh, M. Mahapatra, M. Saeed, Convergence Analysis of a Fifth-
Order Iterative Method Using Recurrence Relations and Conditions on the First Derivative,
Mediterr. J. Math. 18 (2021) 57. https://doi.org/10.1007/s00009-021-01697-6.