Abstract
AbstractWe solve a logistic differential equation for generalized proportional Caputo fractional derivative. The solution is found as a fractional power series. The coefficients of that power series are related to the Euler polynomials and Euler numbers as well as to the sequence of Euler’s fractional numbers recently introduced. Some numerical approximations are presented to show the good approximations obtained by truncating the fractional power series. This generalizes previous cases including the Caputo fractional logistic differential equation and Euler’s numbers.
Funder
Agencia Estatal de Investigación
Consellería de Cultura, Educación e Ordenación Universitaria, Xunta de Galicia
Publisher
Springer Science and Business Media LLC
Subject
Applied Mathematics,Analysis
Cited by
26 articles.
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