Quasiconformal and Quasiregular Maps in Dimensions Larger than Two

Quasiconformal and Quasiregular Maps in Dimensions Larger than Two

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Eden Prywes, Princeton University

​​​​​​Online Talk 

Zoom Link: https://princeton.zoom.us/j/92668943856

We will also use a Gather.town platform for chats from 2:00 PM-2:30 PM.

https://gather.town/invite?token=TQlTdtInLUCwYQUwdKXaIvJGQ7Y2wPcV

Password: PR122021

A quasiconformal map on n-dimensional Euclidean space is a homeomorphism whose differential has bounded distortion at almost every point.  I will discuss these maps and their non-homeomorphic counterparts, quasiregular maps.  I will give a historical background and discuss their properties.  I will then present some recent work regarding their relation to bilipschitz maps and also their generalizations, quasiregular curves.