Přístupnostní navigace
E-application
Search Search Close
Publication detail
ŠMARDA, Z. TŮMA, M. VYROUBALOVÁ, J.
Original Title
Fractional Calculus
Type
course reader
Language
English
Original Abstract
Fractional calculus is an area of mathematical analysis dealing with integration and derivation of any order. In particular, it examines the possibilities of using real and complex numbers as an order of derivatives, or integral. Specifically, we will deal with continuous dynamical systems based on the Riemann-Liouville derivative and integral and the Caputo derivative and integral. The theory is explained using a large number of solved examples. Especially, we pay attention to solution methods of fractional ordinary and functional equations based on the fractional Laplace transform and modifications of analytical methods from the theory of integer differential equations and systems. We also analyze the characteristics of fractional dynamic systems using the Laplace transform. We obtain the impulse characteristic from the non-integer operator transfer functions using Mittag-Leffler functions. A number of results are illustrated with graphical outputs.
Keywords
Differential equations; Fractional laplace transform;Caputo derivative and integral;Riemann-Liouville derivative and integral
Authors
ŠMARDA, Z.; TŮMA, M.; VYROUBALOVÁ, J.
Released
23. 8. 2023
Pages from
1
Pages to
60
Pages count
BibTex
@misc{BUT184443, author="Zdeněk {Šmarda} and Martin {Tůma} and Jana {Vyroubalová}", title="Fractional Calculus", year="2023", pages="1--60", note="course reader" }