Boundaries, conformal maps, and sub-Riemannian geometry
Enrico Le Donne (Jyvaskyla)
Abstract
The objective of this talk is to give a new point of view
for the validity of Fefferman's mapping theorem from 1974. This result
states that a biholomorphism between two smoothly bounded strictly
pseudoconvex domains in C^n extends as a smooth diffeomorphism between
their closures.
Following ideas from Gromov, Mostow, and Pansu, we discuss a method of
proof in the context of quasi-conformal geometry.
In particular, we show that every isometry between smoothly bounded
strictly pseudoconvex domains is 1-quasi-conformal with respect to the
sub-Riemannian distance defined by the Levi form on the boundaries.
Subsequently, a PDE argument shows that such maps are smooth.
This method was proposed by M. Cowling, and it has been implemented in
collaboration with L. Capogna, G. Citti, and A. Ottazzi.