Colloquium Series Date:  Tuesday, March 19, 2013 Location:  1360 East Hall (4:10 PM to 5:00 PM) Title:  Quasi-isometric rigidity of polycyclic groups Abstract:   In his 1983 ICM address, Gromov proposed a program to classify finitely generated groups up to quasi-isometry. This program is a central part of geometric group theory. A major part of the program consists of showing that various classes of groups are quasi-isometrically rigid, i.e. that any group quasi-isometric to a group in the class is also in the class. Eskin, Whyte and I conjecture that the class of polycyclic groups is quasi-isometrically rigid and proved quasi-isometric rigidity of the three dimensional polycyclic groups. A key ingredient is a new technique which we call coarse differentiation. This technique allows us to define a kind of derivative of a quasi-isometry despite the fact that quasi-isometries need not even be continuous. I will discuss current progress towards proving our conjecture. Parts of this are joint with Eskin, Peng and Whyte. Speaker:  David Fisher Institution:  Indiana University Event Organizer:        Edit this event (login required). Add new event (login required). For access requests and instructions, contact math-webmaster@umich.edu Back to previous page Back to UM Math seminars/events page.