Speaker: | Paul Norbury (University of Melbourne) |
Title: | Enumerative geometry via the moduli space of super Riemann surfaces. |
Abstract: | Mumford initiated the calculation of many algebraic topological invariants over the moduli space of Riemann surfaces in the 1980s, and Witten related these invariants to two dimensional gravity in the 1990s. This viewpoint led Witten to a conjecture, proven by Kontsevich, that a generating function for intersection numbers on the moduli space of curves is a tau function of the KdV hierarchy which allowed their evaluation. In 2004, Mirzakhani produced another proof of Witten's conjecture via the study of Weil-Petersson volumes of the moduli space using hyperbolic geometry. In this lecture I will describe a different collection of integrals over the moduli space of Riemann surfaces whose generating function is a tau function of the KdV hierarchy. I will sketch a proof of this result that uses an analogue of Mirzakhani's argument applied to the moduli space of super Riemann surfaces - defined by replacing the field of complex numbers with a Grassmann algebra - which uses recent work of Stanford and Witten. This appearance of the moduli space of super Riemann surfaces to potentially solve a problem over the classical moduli space is deep and surprising. |