Speaker:
Viatcheslav Kharlamov
Date:
Mon, 02/09/2013 - 15:00 - 15:45
Surprisingly, in a quite a number of real enumerative problems the number of real solutions
happens to satisfy high lower bounds. For the moment, such a phenomenon is rather deep
studied in the case of interpolation of real points on a real rational surface by real rational curves. In this talk,
based on a, joint with Rares Rasdeaconu, work in progress, I intend to show that a similar phenomenon should
hold in the case of counting rational curves on K3 surfaces. As in other similar situations, our lower bounds