A monotonicity theorem for the generalized elliptic integral of the first kind

IF 1 4区数学 Q1 MATHEMATICS

Applicable Analysis and Discrete Mathematics Pub Date : 2022-01-01 DOI:10.2298/aadm201005031b

Qi Bao, Xue-Jing Ren, Miao-Kun Wang

引用次数: 1

Abstract

For a ? (0,1/2] and r ? (0,1), let Ka(r) (K (r)) denote the generalized elliptic integral (complete elliptic integral, respectively) of the first kind. In this article, we mainly present a sufficient and necessary condition under which the function a ? [K(r)-Ka(r)]=(1-2a)?(?? R) is monotone on (0,1/2) for each fixed r ? (0,1). The obtained result leads to the conclusion that inequality K (r)- (1-2a)? [K(r)- ?/2] ? Ka(r) ? K (r)-(1-2a)? [K(r)-?/2] holds for all a ? (0,1/2] and r ? (0,1) with the best possible constants ? = ?/2 and ? = 2.

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一类广义椭圆积分的单调性定理

为了一个?(0,1/2)和r ?(0,1)，设Ka(r) (K (r))表示第一类广义椭圆积分(分别为完全椭圆积分)。本文主要给出了函数a ?(K (r) - ka (r)) = (1-2a) ? (? ?R)在(0,1/2)上是单调的对于每个固定的R ?(0, 1)。由此得出不等式K (r)- (1-2a)?[K(r)- ?/2] ?Ka (r) ?K (r) - (1-2a) ?[K (r) - ?/2]适用于所有a ?(0,1/2)和r ?(0,1)用最好的常数?= ?/2和?= 2。

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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来源期刊

Applicable Analysis and Discrete Mathematics MATHEMATICS, APPLIED-MATHEMATICS

CiteScore

2.40

自引率

11.10%

发文量

审稿时长

>12 weeks

期刊介绍： Applicable Analysis and Discrete Mathematics is indexed, abstracted and cover-to cover reviewed in: Web of Science, Current Contents/Physical, Chemical & Earth Sciences (CC/PC&ES), Mathematical Reviews/MathSciNet, Zentralblatt für Mathematik, Referativny Zhurnal-VINITI. It is included Citation Index-Expanded (SCIE), ISI Alerting Service and in Digital Mathematical Registry of American Mathematical Society (http://www.ams.org/dmr/).