汇报标题 (Title):Borsuk’s Partition Problem, Hadwiger’s Covering Conjecutre, and the Boltyanski-Gohberg Conjecture
中文标题:Borsuk 的分区问题、Hadwiger 的覆盖猜测 和 Boltyanski-Gohberg 猜测
汇报人 (Speaker):宗传明(天津大学)
汇报功夫 (Time):2023年12月15日(周五) 10:00
汇报地址 (Place):校本部GJ303
约请人(Inviter):席东盟、李晋、张德凯
主办部门:理学院数学系
汇报提要:In 1933, K. Borsuk proposed the following problem: Can every bounded set in the n-dimensional Euclidean space be divided into n + 1 subsets of smaller diameters? In 1957, H. Hadwiger made the following conjecture: Every n-dimensional convex body K can be covered by 2 n translates of its interior int(K). In 1965, V. G. Boltyanski and I. T.Gohberg made the following conjecture: Every bounded set in an n-dimensional normed space can be divided into 2 n subsets of smaller diameters. These problems are closely related. Up to now, all of them are far away from being completely solved. In this talk, we will introduce a computer approach to these problems. In particular, we will show an asymptotic solution to the Boltyanski-Gohberg conjecture.
