摘要
从可测函数与连续函数的关系出发,利用Lebesgue积分理论与R-S积分的性质,把积分第二中值定理的条件从R可积推广到L可积,并给出了一个新的简洁证明.
This paper, within the theory of the Lebesgue integration and R-S integration, extended the condition of the second integral mean value theorem from Riemann integration to Lebesgue integration. Furthermore, from the relationship between the measurable function and continuous function, a brief proof of the extended one is obtained.
出处
《河南大学学报(自然科学版)》
CAS
北大核心
2012年第3期227-229,共3页
Journal of Henan University:Natural Science
基金
国家自然科学基金资助项目(11105040)
关键词
积分第二中值定理
绝对连续性
R可积
L可积
second integral mean value theorem
abstract continuity
Riemann integration
Lebesgue intergration
