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科学研究
On Dirichlet Problem for Minimal Graphs and Lawson-Osserman Constructions
发布时间:2017-11-10浏览次数:

题目:On Dirichlet Problem for Minimal Graphs and Lawson-Osserman Constructions

报告人:杨翎 教授(复旦大学)

地点:宁静楼110室

时间:2017年11月10日(周五)下午14:30-15:30

摘要:We develop the Lawson-Osserman's works on minimal graphs. Firstly, we construct a constellation of uncountably many Lawson-Osserman spheres, which are minimal in Euclidean spheres and therefore generate Lawson-Osserman cones that correspond to Lipschitz but non-differentiable solutions to the minimal surface system. Then, by the theory of autonomous systems in plane, we find for each Lawson-Osserman cone an entire minimal graph having it as tangent cone at infinity. Further, in addition to the truncated Lawson-Osserman cones, we discover infinitely many analytic solutions to the Dirichlet problem of minimal surfaces system for boundary data induced by certain Lawson-Osserman spheres. As a corollary, those Lawson-Osserman cones are non-minimizing. These behaviors are observed for the first time. This is the joint work with Prof. Xiaowei Xu and Yongsheng Zhang.

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