Application of the Exact Operational Matrices Based on the Bernstein Polynomials
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Authors
K. Parand
- Computer Sciences, Faculty of Mathematical Sciences Shahid Beheshti University, Evin,Tehran 19839, Iran.
Sayyed A. Kaviani
- Computer Sciences, Faculty of Mathematical Sciences Shahid Beheshti University, Evin,Tehran 19839, Iran.
Abstract
This paper aims to develop a new category of operational matrices. Exact operational matrices (EOMs) are matrices which integrate, differentiate and product the vector(s) of basis functions without any error. Some suggestions are offered to overcome the difficulties of this idea (including being forced to change the basis size and having more equations than unknown variables in the final system of algebraic equations). The proposed idea is implemented on the Bernstein basis functions. By both of the newly extracted Bernstein EOMs and ordinary operational matrices (OOMs) of the Bernstein functions, one linear and one nonlinear ODE is solved. Special attention is given to the comparison of numerical results obtained by the new algorithm with those found by OOMs.
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ISRP Style
K. Parand, Sayyed A. Kaviani, Application of the Exact Operational Matrices Based on the Bernstein Polynomials, Journal of Mathematics and Computer Science, 6 (2013), no. 1, 36-59
AMA Style
Parand K., Kaviani Sayyed A., Application of the Exact Operational Matrices Based on the Bernstein Polynomials. J Math Comput SCI-JM. (2013); 6(1):36-59
Chicago/Turabian Style
Parand, K., Kaviani, Sayyed A.. "Application of the Exact Operational Matrices Based on the Bernstein Polynomials." Journal of Mathematics and Computer Science, 6, no. 1 (2013): 36-59
Keywords
- Exact Operational matrices
- Bernstein polynomials
- Bessel differential equation
- Emden-Fowler equation.
MSC
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