均匀收敛和逐点收敛Uniform convergence and pointwise convergence |
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课程网址: | http://unow.nottingham.ac.uk/resources/resource.aspx?hid=e29ada63... |
主讲教师: | Joel Feinstein |
开课单位: | 诺丁汉大学 |
开课时间: | 信息不详。欢迎您在右侧留言补充。 |
课程语种: | 英语 |
中文简介: | 本教材的目的是向学生介绍实值函数序列的两个收敛概念。点态收敛的概念相对简单,但一致收敛的概念更加微妙。用闭函数球和集合吸收序列的新概念解释了一致收敛性。用几个例子说明了这两种收敛类型之间的区别。还讨论了一些标准事实:连续函数的一致极限必须是连续的;有界函数的一致极限必须有界;无界函数的一致极限必须是无界的。目标受众:所有理解实值函数的人,以及理解实数序列收敛的概念的人,都应该能够接触到这些材料。这应该包括大多数数学本科学生在他们的第一年结束。理解在不同领域上定义的实值函数的连续性和有界性,将有助于学生理解材料的后一部分。 |
课程简介: | The aim of this material is to introduce the student to two notions of convergence for sequences of real-valued functions. The notion of pointwise convergence is relatively straightforward, but the notion of uniform convergence is more subtle. Uniform convergence is explained in terms of closed function balls and the new notion of sets absorbing sequences. The differences between the two types of convergence are illustrated with several examples. Some standard facts are also discussed: a uniform limit of continuous functions must be continuous; a uniform limit of bounded functions must be bounded; a uniform limit of unbounded functions must be unbounded. Target audience: Most of this material should be accessible to anyone who understands what a real-valued function is, and understands the notion of convergence of a sequence of real numbers. This should include most mathematics undergraduates by the end of their first year. An understanding of continuity and of boundedness for real-valued functions defined on various types of domain would help the student to understand the latter part of the material. |
关 键 词: | 实值函数; 收敛概念; 闭函数 |
课程来源: | 信息不详。欢迎您在右侧留言补充。 |
最后编审: | 2018-12-18:wrq |
阅读次数: | 220 |