Falade K.I

Work place: Department of Mathematics, Faculty of Computing and Mathematical Sciences, Kano University of Science and Technology, P.M.B 3244 Wudil, Kano State, Nigeria

E-mail: faladekazeem2016@kustwudil.edu.ng


Research Interests: Computer systems and computational processes, Computational Mathematics


FALADE Kazeem Iyanda Ph.D is currently a lecturer in the Department of Mathematics Kano University of Science and Technology, Wudil Kano State Nigeria. His area of research interest is Numerical and Computational Mathematics. He is a member of Nigerian Mathematical Society (NMS), Mathematical Association of Nigeria (MAN) and Nigerian Association of Mathematical Physics (NAMP).

Author Articles
Numerical Solution of Partial Differential Equations with Fractional Variable Coefficients Using New Iterative Method (NIM)

By Falade K.I Tiamiyu A.T

DOI: https://doi.org/10.5815/ijmsc.2020.03.02, Pub. Date: 8 Jun. 2020

In this paper, we studied to obtain numerical solutions of partial differential equations with fractional variable coefficient by MAPLE 18 software algorithm on New Iterative Method. We examined and investigated behaviours of the fractional variable coefficients (Even and Odd) on first order partial differential equation; we obtain numerical solution and plot 2D/3D graphs representation of eight (8) cases for the study of the sequential trend of the fractional coefficients. The simplicity and the accuracy of the proposed numerical scheme are verified. More numerical examples will be used in the future for further testing the ability of the proposed scheme for solving some classical problems in engineering sciences.

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A Numerical Approach for Solving High-Order Boundary Value Problems

By Falade K.I

DOI: https://doi.org/10.5815/ijmsc.2019.03.01, Pub. Date: 8 Jul. 2019

In this paper, a numerical method which produces an approximate solution is presented for the numerical solutions of sixth,eighth,ninth and twelfth order boundary value problems. With the aid of derivatives of power series which slightly perturbe and collocate, eventually converts boundary value problems into the square matrix equations with the unknown coefficients obtain using MAPLE 18 software. This method gives the approximate solutions and compare with the exact solutions. Finally, some examples and their numerical solutions are given by comparing the numerical results obtained to other methods available in the literature, show a good agreement and efficiency.

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