On the Definitions of Fractional Sum and Difference on Non-uniform Lattices
As is well known, the idea of a fractional sum and difference on uniform lattice is more current, and gets a lot of development in this field. But the definitions of fractional sum and fractional difference of $f(z)$ on non-uniform lattices $x(z)=c_{1}z^{2}+c_{2}z+c_{3}$ or $x(z)=c_{1}q^{z}+c_{2}q^{...
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| creator | Cheng, Jinfa |
| description | As is well known, the idea of a fractional sum and difference on uniform
lattice is more current, and gets a lot of development in this field. But the
definitions of fractional sum and fractional difference of $f(z)$ on
non-uniform lattices $x(z)=c_{1}z^{2}+c_{2}z+c_{3}$ or
$x(z)=c_{1}q^{z}+c_{2}q^{-z}+c_{3}$ seem much more difficult and complicated.
In this article, for the first time we propose the definitions of the
fractional sum and fractional difference on non-uniform lattices by two
different ways. The analogue of Euler's Beta formula, Cauchy' Beta formula on
on non-uniform lattices are established, and some fundamental theorems of
fractional calculas, the solution of the generalized Abel equation and
fractional central difference equations on non-uniform lattices are obtained
etc. |
| doi_str_mv | 10.48550/arxiv.1910.05130 |
| format | Article |
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lattice is more current, and gets a lot of development in this field. But the
definitions of fractional sum and fractional difference of $f(z)$ on
non-uniform lattices $x(z)=c_{1}z^{2}+c_{2}z+c_{3}$ or
$x(z)=c_{1}q^{z}+c_{2}q^{-z}+c_{3}$ seem much more difficult and complicated.
In this article, for the first time we propose the definitions of the
fractional sum and fractional difference on non-uniform lattices by two
different ways. The analogue of Euler's Beta formula, Cauchy' Beta formula on
on non-uniform lattices are established, and some fundamental theorems of
fractional calculas, the solution of the generalized Abel equation and
fractional central difference equations on non-uniform lattices are obtained
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lattice is more current, and gets a lot of development in this field. But the
definitions of fractional sum and fractional difference of $f(z)$ on
non-uniform lattices $x(z)=c_{1}z^{2}+c_{2}z+c_{3}$ or
$x(z)=c_{1}q^{z}+c_{2}q^{-z}+c_{3}$ seem much more difficult and complicated.
In this article, for the first time we propose the definitions of the
fractional sum and fractional difference on non-uniform lattices by two
different ways. The analogue of Euler's Beta formula, Cauchy' Beta formula on
on non-uniform lattices are established, and some fundamental theorems of
fractional calculas, the solution of the generalized Abel equation and
fractional central difference equations on non-uniform lattices are obtained
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lattice is more current, and gets a lot of development in this field. But the
definitions of fractional sum and fractional difference of $f(z)$ on
non-uniform lattices $x(z)=c_{1}z^{2}+c_{2}z+c_{3}$ or
$x(z)=c_{1}q^{z}+c_{2}q^{-z}+c_{3}$ seem much more difficult and complicated.
In this article, for the first time we propose the definitions of the
fractional sum and fractional difference on non-uniform lattices by two
different ways. The analogue of Euler's Beta formula, Cauchy' Beta formula on
on non-uniform lattices are established, and some fundamental theorems of
fractional calculas, the solution of the generalized Abel equation and
fractional central difference equations on non-uniform lattices are obtained
etc.</abstract><doi>10.48550/arxiv.1910.05130</doi><oa>free_for_read</oa></addata></record> |
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| subjects | Mathematics - Classical Analysis and ODEs Mathematics - Complex Variables |
| title | On the Definitions of Fractional Sum and Difference on Non-uniform Lattices |
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