Measure and Integral
This course provides a comprehensive introduction to the fundamental concepts of measure theory and integration, with a focus on Lebesgue measure as a primary example.
讲师
日期
2024年09月30日 至 12月27日
位置
Weekday | Time | Venue | Online | ID | Password |
---|---|---|---|---|---|
周一 | 15:20 - 16:55 | A14-202 | ZOOM 13 | 637 734 0280 | BIMSA |
参考资料
[1] R.L. Wheeden and A. Zygmund, Measure and Integral: An introduction
to Real Analysis, Marcel Dekker, 1977.
[2] T. Tao, Introduction to Measure Theory, American Mathematical Society,
2011.
[3] E. Stein and R. Sakarchi, Real Analysis: Measure Theory, Integration,
and Hilbert Spaces, Princeton University Press, 2005.
[4] J, Kinnunen, Measure and Integral, 2016
[5] M.E. Taylor, Measure theory and integration, American Mathematical
Society, 2006.
[6] J. Yeh, Real Analysis, Theory of Measure and Integration (2nd edition),
World Scientific, 2006.
to Real Analysis, Marcel Dekker, 1977.
[2] T. Tao, Introduction to Measure Theory, American Mathematical Society,
2011.
[3] E. Stein and R. Sakarchi, Real Analysis: Measure Theory, Integration,
and Hilbert Spaces, Princeton University Press, 2005.
[4] J, Kinnunen, Measure and Integral, 2016
[5] M.E. Taylor, Measure theory and integration, American Mathematical
Society, 2006.
[6] J. Yeh, Real Analysis, Theory of Measure and Integration (2nd edition),
World Scientific, 2006.
听众
Undergraduate
, Advanced Undergraduate
, Graduate
, 博士后
, Researcher
视频公开
不公开
笔记公开
不公开
语言
英文