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Introduction to fractional calculus
(Based on lectures by R. Goreno, F. Mainardi and I.
Podlubny)
R. Vilela Mendes
July 2008
() July 2008 1 / 44
Contents
- Historical origins of fractional calculus
- Fractional integral according to Riemann-Liouville
- Caputo fractional derivative
- Riesz-Feller fractional derivative
- Grünwal-Letnikov
- Integral equations
- Relaxation and oscillation equations
- Fractional di¤usion equation
- A nonlinear fractional di¤erential equation. Stochastic solution
- Geometrical interpretation of fractional integration
() July 2008 2 / 44
Fractional Calculuswas born in1695
dn f
dtn
What if the
order will be
n = ½?
It will lead to a
paradox, from which
one day useful
consequences will be Start
drawn. ◭◭ ◮◮
G.F.A. de L’Hôpital G.W. Leibniz ◭ ◮
10 / 90
(1661–1704) (1646–1716) Back
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G. W. Leibniz (1695–1697)
In the letters to J. Wallis and J. Bernulli (in 1697) Leibniz
mentioned the possible approach to fractional-order differ-
entiation in that sense, that for non-integer values of n the
definition could be the following:
n mx
d e n mx
dxn =m e ,
Start
◭◭ ◮◮
◭ ◮
11 / 90
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