题目:Rigidity of Discrete Conformal Structures on Two- and Three-Dimensional Manifolds
报告人:徐旭 副教授 (武汉大学)
地点:腾讯会议室
时间:2021年9月2日 8:00-9:00
摘要: Discrete conformal structure is a discrete analogue of the smooth conformal structure on manifolds. There are different types of discrete conformal structures that have been extensively studied in the history, including the tangential circle packing, Thurston's circle packing, inversive distance circle packing and vertex scaling on surfaces, sphere packing and Thurston's sphere packing on 3-dimensional manifolds. In this talk, we will discuss some recent progresses on the rigidity of discrete conformal structures on two- and three-dimensional manifolds, including Glickenstein’s conjecture on the rigidity of discrete conformal structures on surfaces and Cooper-Rivin’s conjecture on the rigidity of sphere packings on three dimensional manifolds.
腾讯会议://meeting.tencent.com/dm/JhgT1PReGNuT
会议 ID:767 357 912
All are welcome!