Characteristic numbers of elliptic fibrations with non-trivial Mordell-Weil groups

Abstract

We compute characteristic numbers of elliptically fibered fourfolds with multisections or non-trivial Mordell-Weil groups. We first consider the models of type E9-d with d=1,2,3,4 whose generic fibers are normal elliptic curves of degree d. We then analyze the characteristic numbers of the Q7-model, which provides a smooth model for elliptic fibrations of rank one and generalizes the E5, E6, and E7-models. Finally, we examine the characteristic numbers of G-models with G=SO(n) with n=3,4,5,6 and G=PSU(3) whose Mordell-Weil groups are respectively Z/2Z and Z/3 Z. In each case, we compute the Chern and Pontryagin numbers, the Euler characteristic, the holomorphic genera, the Todd-genus, the L-genus, the A-genus, and the eight-form curvature invariant from M-theory.