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2021年必威“必威betway学子全球胜任力提升计划”研究生系列短课程(9)

发表于: 2021-07-08   点击: 

报告题目:关于液晶方程的数学分析问题

报 告 人:Changyou Wang,Purdue University

报告地点:腾讯会议 会议 ID:991 4503 5304

校内联系人:郭斌 bguo@jlu.edu.cn


Abstract: Liquid crystal materials exhibit basic features of both liquid state and solid state, i.e. they enjoy both the crystalline structure and the fluid structure. In particular, it has an optical structure that can be transformed under either temperature changes or the action of external electric or magnetic fields. They have found profound applications in Liquid Crystal Devices (LCD). There have been tremendous studies on liquid crystals by applied physicists, material scientists, and mathematic- ians. In this lecture series, we would like to introduce both the static theory and the dynamic theory of liquid crystals, namely, the Oseen-Frank model and the Ericksen-Leslie model. The former concerns the equiqibriums of the Oseen-Frank energy functional, that can be studied through calculus of variations. The latter concerns the hydrodynamic evolution of liquid crystals, that can be viewed as a dissipative system coupling between the underlying fluid (via the Navier-Stokes equation) and the liquid crystal orientation field (via the heat flow of harmonic maps). The fundamental questions are: (i) the existence of global weak solutions in the finite energy spaces. (ii) the issue of regularity and uniqueness of certain classes of weak solutions . (iii) the existence of finite time singularity of locally smooth solutions . (iV) the local and global well posedness problem for a largest possible function space of initial data

授课日期

Date of Lecture

课程名称(讲座题目)

Name (Title) of Lecture

授课时间

Duration (Beijing Time)

参与人数

Number of Participants

July 5, 2021

Static theory and Background I

8:30-9:30

40

July 5, 2021

Static theory and Background II

9:30-10:30

40

July 7, 2021

Open problems about LCE I

8:30-9:30

40

July 7, 2021

Open problems about LCE II

9:30-10:30

40

July 9, 2021

The method I

8:30-9:30

40

July 9, 2021

The method II

9:30-10:30

40

July 12,2021

Hamonic map I

8:30-9:30

40

July 12, 2021

Hamonic map I

9:30-10:30

40

July 14, 2021

Application

8:30-9:30

40

July 14, 2021

Summary

9:30-10:30

40


Lecture 1: Static theory and Background I

Lecture 2: Static theory and Background II

Lecture 3: Some problems of the Oseen-Frank model

Existence and regularity of Oseen-Frank energy minimizers

Lecture 4: Some problems of the Ericksen-Leslie mode

compensated compactness property

Lecture 5: The method I,

Direct methods in proving the minimize of the energy functional.

Lecture 6: The method II,

Compasion Principle

Lecture 7: Hamonic map I

Holder continuity, twice differential

Lecture 8: Hamonic map II

Some properties of Harminic Map, Myers estimates

Lecture 9: Application

The latter concerns the hydrodynamic evolution of liquid crystals, that can be viewed as a dissipative system coupling between the underlying fluid (via the Navier-Stokes equation) and the liquid crystal orientation field (via the heat flow of harmonic maps).

Lecture 10: Summary


报告人简介:

王长友,美国普渡大学教授,从事偏微分方程和几何分析的研究,在CPAM, AMRA, CPDE, JDE, SIAM J. Math. Anal., JFA, CVPDE等杂志上发表多篇高水平论文。