Results 91 to 100 of about 859,715 (101)

Some inequalities for convex functions

open access: yes, 2011
碩士Hadmard''s不等式是相當著名的不等式,研究者眾,最近 B.G.Pachpatte 做出兩函數相乘Hadmard''s 型不等式。 本文Pachpatte所証的定理再推廣與運用,將雙函數f(x); g(x)推 廣至三函數f(x); g(x); h(x), 而得到一些不等式。Some new inequalities related to the right-hand side of Hadamard’s inequalities are obtained.1 介紹1 2 主要結論3 ...
游俊雄; Yu, Chun Hsiung
core  

[The molecular pathogenesis of small cell lung cancer]. [PDF]

open access: yesZhongguo Fei Ai Za Zhi, 2010
D'Angelo SP, Pietanza MC.
europepmc   +1 more source

Some refinements of Hadamard's inequalities

open access: yes, 2014
碩士設 :I R→R 是一個定義在區間I上的凸函數, I . 則以下不等式成立 (1.1) 此為Hadamard不等式 本文建立一些不等式(1.1)更細緻的結果。Let :I R→R be a convex function defined an the interval I of real numbers and I with .
劉恩君; Liu, En-Chun
core  

Global Acceptance of Biosimilars: Importance of Regulatory Consistency, Education, and Trust. [PDF]

open access: yesOncologist, 2018
Cazap E   +4 more
europepmc   +1 more source

Mass of components and material distribution in lateral flow assay kits. [PDF]

open access: yesBull World Health Organ
Wöhrle ML   +2 more
europepmc   +1 more source

Some generalizations of Hadamard's double inequality

open access: yes, 2014
碩士設 →R為凸函數,則下列不等式成立 (1.1) 此為眾所周知的Hadamard的雙邊不等式。 本文建立一些不等式(1.1)的推廣。The following double inequality f( ) f(x)dx (1.1) which holds for all convex functions →R is known in the literature as the Hadamard’s inequality.
鄭名珊; Cheng, Ming-Shan
core  

Wait time for multi-messages polling system under mixed Service

open access: yes, 2000
本文给出混合式服务方式下,多队列多信息排队系统内不同类对象的平均等待时间。文中首先介绍系统的服务方式,即对不同类对象分别采用门限式服务和限定式服务。给出不同类对象的等待过程;然后采用是新原理和随权凋测法,给出不同类对象的平均等待时间;最后与单一限定方式下对象的平均等待时间进行了比较 ...
王智   +4 more
core  

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