Title of article
Fractional calculus in the Mellin setting and Hadamard-type fractional integrals
Author/Authors
Paul L. Butzer، نويسنده ,
Issue Information
دوهفته نامه با شماره پیاپی سال 2002
Pages
27
From page
1
To page
27
Abstract
The purpose of this paper and some to follow is to present a new approach to fractional
integration and differentiation on the half-axis R+ = (0,∞) in terms of Mellin analysis.
The natural operator of fractional integration in this setting is not the classical Liouville
fractional integral Iα
0+f but
J α
0+,cf (x) :=
1
Γ (α)
x
0
u
x c log
x
u α−1 f (u)du
u
(x > 0)
for α >0, c ∈ R. The Mellin transform of this operator is simply (c − s)−αM[f ](s), for
s = c + it , c, t ∈ R. The Mellin transform of the associated fractional differentiation operator
Dα
0+,cf is similar: (c −s)αM[f ](s). The operator Dα
0+,cf may even be represented
as a series in terms of xkf (k)(x), k ∈ N0, the coefficients being certain generalized Stirling
functions Sc(α, k) of second kind. It turns out that the new fractional integral J α
0+,cf and
three further related ones are not the classical fractional integrals of Hadamard (J.Mat. Pure
Appl. Ser. 4, 8 (1892) 101–186) but far reaching generalizations and modifications of these.
These four new integral operators are first studied in detail in this paper. More specifically,conditions will be given for these four operators to be bounded in the space X
p
c of Lebesgue
measurable functions f on (0,∞), for c ∈ (−∞,∞), such that ∞0 |ucf (u)|p du/u<∞ for 1 p < ∞ and ess supu>0[uc|f (u)|] < ∞ for p = ∞, in particular in the space
Lp(0,∞) for 1 p ∞. Connections of these operators with the Liouville fractional
integration operators are discussed. The Mellin convolution product in the above spaces
plays an important role
Keywords
Fractional integration and differentiation , Hadamard-type fractional integrals , Mellintransform , Stirling functions ofsecond kind , Weighted spaces of p-summable functions , Mellin convolution
Journal title
Journal of Mathematical Analysis and Applications
Serial Year
2002
Journal title
Journal of Mathematical Analysis and Applications
Record number
929906
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