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Generic regularity of free boundaries for the obstacle problem in $R^3$
2018-07-23 00:00:00

报告题目:

Generic regularity of free boundaries for the obstacle problem in $R^3$

报 告 人:

Xavier Ros-Oton (Universit?t Zürich)

报告时间:

2018年07月26日 10:30--11:30

报告地点:

金沙9001cc诚为本东北楼一楼报告厅(110)

报告摘要:

Free boundary problems are those described by PDE's that exhibit a priori unknown (free) interfaces or boundaries. The obstacle problem is the most classical and motivating example in the study of free boundary problems. A milestone in this context is the classical work of Caffarelli (Acta Math. 1977), in which he established for the first time the regularity of free boundaries in the obstacle problem, outside a certain set of singular points. A long-standing open question in the field asks to establish generic regularity results in this setting (e.g. to prove that for almost every boundary data there are no singular points). This type of questions arise as well in many other nonlinear PDE's and in Geometric Analysis. The goal of this talk is to present some new results in this context, proving in particular the generic regularity of free boundaries for the obstacle problem in $R^3$. This is a joint work with J. Serra and A. Figalli.