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2020年算子代数系列学术报告

发布时间:2020-05-13文章来源: 浏览次数:

1. 报告题目:Mild well-posedness of differential equations on the real

line in Banach spaces

报告人:步尚全教授(清华大学数学系)

报告摘要:In this talk, we will give the recent results on the mild well-posedness of differential equations with values in complex Banach spaces. The main tools are operator-valued Fourier multipliers on the corresponding vector-valued fucntion spaces.

报告时间:2020529日上午8:30-9:15

报告地点:腾讯会议 会议 ID869 774 993

2. 报告题目:Generalizations of Wigner’s Theorem

报告人:吴文明教授(重庆师范大学数学科学学院)

报告摘要:这是一个综述报告。在报告中,我首先介绍Wigner定理的意义和历史,然后重点介绍Wigner定理的各种推广,以及我们团队取得的相关成果。最后列出一些仍有待解决的问题。

报告时间:2020529日上午9:20-10:00

报告地点:腾讯会议 会议 ID869 774 993

3. 报告题目:Sum preserving maps on $L^p$

报告人:李磊副教授(南开大学数学科学学院)

报告摘要: Suppose that $1<p<\infty$ and $S(L^p)_+$ is the positive elements of norm one. Assume that $V$ is a sum preserving map between $S(L^p)_+$, that is, $\|V(x)+V(y)\|=\|x+y\|$. In this talk, I will give the representation of such $V$. This is a joint work with Yunbai Dong and Jingjing Hao.

报告时间:2020529日上午10:15-10:55

报告地点:腾讯会议 会议 ID869 774 993

4. 报告题目:Realization of rigid C*-bicategories as bimodules over type II_1 von Neumann algebras

报告人:袁巍副研究员(中国科学院数学与系统科学研究院)

报告摘要: It is known that every rigid C*-tensor category can be realized as bimodules over II_1 factors. In this talk, I will provide a machinery to bootstrap realization of tensor categories to rigid C*-bicategories and show that every rigid C*-bicategories can be realized as bimodules over type II_1 von Neumann algebras. In particular, every rigid multi-tensor C*-category can be realized as bimodules over a finite direct sum of hyperfinite II_1 factors.

报告时间:2020529日上午11:00-11:40

报告地点:腾讯会议 会议 ID869 774 993


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