Abstract
In this paper, the fundamental properties of fractional calculus are discussed with the aim of extending the definition of fractional operators by using wavelets. The Haar wavelet fractional operator is defined, in a more general form, independently on the kernel of the fractional integral.
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APA
Cattani, C. (2022). Haar wavelet fractional derivative. Proceedings of the Estonian Academy of Sciences, 71(1), 55–64. https://doi.org/10.3176/proc.2022.1.05
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