关于多元分数阶Taylor和Cauchy中值定理

IF 0.8 4区数学 数学研究 Pub Date : 2019-06-01 DOI:10.4208/JMS.V52N1.19.04

Jinfa Cheng

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引用次数: 5

摘要

本文给出了f（x，y）=n∑j=0 Djαf（x0，y0）Γ（jα+1）+Rn（ξ，η，已建立。这种表达式正是在特定情况下α=1的经典泰勒和柯西中值定理。此外，还给出了涉及序列Caputo分数导数的Rn（ξ，η）和Tαn（ξ.，η）的详细表达式。AMS受试者分类：65M70、65L60、41A10、60H35

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On Multivariate Fractional Taylor’s and Cauchy’ Mean Value Theorem

In this paper, a generalized multivariate fractional Taylor’s and Cauchy’s mean value theorem of the kind f (x,y)= n ∑ j=0 Djα f (x0,y0) Γ(jα+1) +Rn(ξ,η), f (x,y)− n ∑ j=0 Djα f (x0,y0) Γ(jα+1) g(x,y)− n ∑ j=0 Dg(x0,y0) Γ(jα+1) = Rn(ξ,η) Tα n (ξ,η) , where 0< α≤ 1, is established. Such expression is precisely the classical Taylor’s and Cauchy’s mean value theorem in the particular case α=1. In addition, detailed expressions for Rn(ξ,η) and Tα n (ξ,η) involving the sequential Caputo fractional derivative are also given. AMS subject classifications: 65M70, 65L60, 41A10, 60H35

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数学研究 MATHEMATICS-

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1109

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