For more information about this meeting, contact Dmitri Burago, Anatole Katok, Aaron Brown.
|Title:||Counting Maps to Hyperbolic Curves|
|Seminar:||Center for Dynamics and Geometry Seminars|
|Speaker:||Tatiana Bandman, Bar-Ilan University, Israel|
|The little Picard theorem asserts that every entire function in one variable that omits at least two values is constant. Notice that the complex plane with two punctures is a complex hyperbolic curve.
In this talk we discuss the following questions that may be viewed as a higher-dimensional generalization of the Picard theorem .
Let X of be a complex algebraic variety. Does it admit a non-constant holomorphic map to a complex hyperbolic curve? If yes, then how many?|
Room Reservation Information
|Date:||04 / 11 / 2012|
|Time:||03:35pm - 05:30pm|