The kernel of the monodromy of the universal family of degree d smooth plane curves

Abstract

We consider the parameter space Ud of smooth plane curves of degree d. The universal smooth plane curve of degree d is a fiber bundle Ed Ud with fiber diffeomorphic to a surface g. This bundle gives rise to a monodromy homomorphism d:π1( Ud)(g), where Mod(g):=π0(Diff+(g)) is the mapping class group of g. The main result of this paper is that the kernel of 4:π1( U4)(3) is isomorphic to F∞×Z/3Z, where F∞ is a free group of countably infinite rank. In the process of proving this theorem, we show that the complement Teich(g)g of the hyperelliptic locus Hg in Teichm\"uller space Teich(g) has the homotopy type of an infinite wedge of spheres. As a corollary, we obtain that the moduli space of plane quartic curves is aspherical. The proofs use results from the Weil-Petersson geometry of Teichm\"uller space together with results from algebraic geometry.