路径上复积分的Ostrowski型不等式

IF 1.1 Q1 MATHEMATICS

Constructive Mathematical Analysis Pub Date : 2020-11-02 DOI:10.33205/cma.798861

S. Dragomir

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引用次数: 3

摘要

本文将Ostrowski不等式推广到关于弧长的积分，在γ是由z（t）、t∈[a，b]和长度l（γ）、u=z（a）、v=z（x）和x∈（a，b）和w=z（b）参数化的光滑路径的假设下，通过提供量|f（v）l（γ。文中还给出了圆路径的一个应用。还提供了循环路径和一些感兴趣的特殊函数（如指数函数）的几个应用。

本文章由计算机程序翻译，如有差异，请以英文原文为准。

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Ostrowski's Type Inequalities for the Complex Integral on Paths

In this paper we extend the Ostrowski inequality to the integral with respect to arc-length by providing upper bounds for the quantity |f(v)l(γ)-∫_{γ}f(z)|dz|| under the assumptions that γ is a smooth path parametrized by z(t), t∈[a,b] with the length l(γ), u=z(a), v=z(x) with x∈(a,b) and w=z(b) while f is holomorphic in G, an open domain and γ⊂G. An application for circular paths is also given. Several applications for circular paths and for some special functions of interest such as the exponential functions are also provided.

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来源期刊

Constructive Mathematical Analysis Mathematics-Analysis

CiteScore

2.40

自引率

0.00%

发文量

审稿时长

6 weeks