Low-regularity local wellposedness of Chern-Simons-Schroedinger

Monday, October 15, 2012 -
3:15pm to 4:15pm
The Chern-Simons-Schroedinger model in two spatial dimensions is a covariant NLS-type problem that is $L^2$ critical. We prove that, with respect to the heat gauge, this problem is locally well-posed for initial data that is small in $H^s$, $s > 0$. This work is joint with Baoping Liu and Daniel Tataru.
Paul Smith
UC Berkeley
Event Location: 
Fine Hall 314