A Novel Operational Matrix of Caputo Fractional Derivatives of Fibonacci Polynomials: Spectral Solutions of Fractional Differential Equations
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Title
A Novel Operational Matrix of Caputo Fractional Derivatives of Fibonacci Polynomials: Spectral Solutions of Fractional Differential Equations
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Keywords
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Journal
Entropy
Volume 18, Issue 10, Pages 345
Publisher
MDPI AG
Online
2016-09-23
DOI
10.3390/e18100345
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- Efficient Chebyshev spectral methods for solving multi-term fractional orders differential equations
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- (2011) Mujeeb ur Rehman et al. Communications in Nonlinear Science and Numerical Simulation
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- On k-Fibonacci sequences and polynomials and their derivatives
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