Title :
Fractional order differentiator using legendre polynomials
Author :
Singh, Koushlendra K. ; Pandey, Rajan K. ; Suman, Shailabh
Author_Institution :
Design Manuf., PDPM Indian Inst. of Technol., Jabalpur, India
Abstract :
In this paper, a discrete time fractional order differentiator has been modeled for estimating the fractional order derivatives of contaminated signal based on Legendre´s polynomials. The given signal is approximated with Legendre polynomials of different degrees. The Riemann-Liouville (R-L) fractional order derivative definition is used. For finding the fractional order derivatives of signal, first of all, window weight corresponding to required fractional order is calculated. In second step, calculated window weight is convolved with the signal. Several test signals are considered for validation of the proposed method. The proposed method performs better for noisy data also.
Keywords :
Legendre polynomials; polynomial approximation; signal processing; Legendre polynomials; R-L fractional order derivative definition; Riemann-Liouville fractional order derivative definition; contaminated signal; discrete time fractional order differentiator; fractional order derivatives; noisy data; window weight; Convolution; Filtering; Least squares approximations; Noise measurement; Polynomials; Smoothing methods; Fractional order derivative; Legendre polynomials; S-G differentiator;
Conference_Titel :
Confluence The Next Generation Information Technology Summit (Confluence), 2014 5th International Conference -
Conference_Location :
Noida
Print_ISBN :
978-1-4799-4237-4
DOI :
10.1109/CONFLUENCE.2014.6949223
