Weekly seminar, AG Laboratory: F.Bogomolov
Event ended
February 24, 2017 - 5:00 p.m. - room 306
In this talk I introduce and discuss geometry of curves parametrizing subset of points in $P^1$ obtained as projections of torsion points of elliptic curves. For every subset of different $k$ points in $P^1$ we can define it's image in the moduli $M_{0,k}$ of $k$-tuples of points which is essentially a quotient of projective space $S^kP^1= P^k$ by the action of $PGL(2)$. Thus $M_{0,k}$ is a rational variety of dimension $k-3$. If we consider the images of points of finite order in different elliptic curves under natural projections then we obtain an( infinite) system of modular typoe curves with maps into $M_{0,k}$ I will formulate three conjectures (semi theorems) about properties of such maps which provide a possiblity of realistic universal estimate for intersections between subset of torsion points for different elliptic curves.