Generalizations of fractional q -Leibniz formulae and applications

Zeinab SI Mansour

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Generalizations of fractional q -Leibniz formulae and applications

机译：分数q -Leibniz公式的推广和应用

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In this paper we generalize the fractional q-Leibniz formula introduced by Agarwal in (Ganita 27(1-2):25-32, 1976) for the Riemann-Liouville fractional q-derivative. This extension is a q-version of a fractional Leibniz formula introduced by Osler in (SIAM J. Appl. Math. 18(3):658-674, 1970). We also introduce a generalization of the fractional q-Leibniz formula introduced by Purohit for the Weyl fractional q-difference operator in (Kyungpook Math. J. 50(4):473-482, 2010). Applications are included.

机译：在本文中，我们推广了Agarwal在（Ganita 27（1-2）：25-32，1976）中为Riemann-Liouville分数q导数引入的分数q-Leibniz公式。此扩展是Osler在（SIAM J. Appl。Math。18（3）：658-674，1970）中引入的分数莱布尼兹公式的q版本。我们还在（Kyungpook Math。J.50（4）：473-482，2010）中引入了由Purohit为Weyl分数q-差分算子引入的分数q-Leibniz公式的推广。包括应用程序。

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《Advances in Difference Equations 》 |2013年第1期| 共页
作者
Zeinab SI Mansour;
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中图分类数学 ;
关键词
Summation FormulaLeibniz RuleDouble SeriesLeibniz FormulaPrevious Identity;

机译：求和公式Leibniz规则双重系列Leibniz公式以前的身份;

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8. LEIBNIZ RULE, THE CHAIN RULE, AND TAYLOR’S THEOREM FOR FRACTIONAL DERIVATIVES [R] . Thomas J. Osler 1970

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Generalizations of fractional q -Leibniz formulae and applications

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