摘要
在对数导数意义下,万有Teichmüller空间T_1可表示为无穷多个互不相交的连通分支的并集T_1={■ L_θ}∪L,研究了该模型分支边界的几何性质,证明了L与L_θ的边界存在无穷多个公共点,同时还解决了关于一个分支中的点到另一分支中心距离上确界的公开问题.
The model of the Universal Teichmiiller Space by the derivative of logarithm is the union of infinitely many disconnected components: T1={∪θ∈(0,2π) Lθ}∪L. In this paper, the geometric property of the boundary of T1 is investigated, and it is proved that for any θ∈(0,2π)δL and δLθ have infinitely many common points. In addition, an open problem about the supremum of the distance from the points of one component to the center of another component is solved.
出处
《数学年刊(A辑)》
CSCD
北大核心
2007年第3期395-402,共8页
Chinese Annals of Mathematics
基金
国家自然科学基金(No.10571028)资助的项目.
