The smooth Mordell-Weil group and mapping class groups of elliptic surfaces

This is a paper in smooth 4-manifold topology, inspired by the Mordell-Weil Theorem in number theory. More precisely, we prove a smooth version of the Mordell-Weil Theorem and apply it to the `unipotent radical' case of a Thurston-type classification of mapping classes of simply-connected 4-manifolds Md that admit the structure of an elliptic complex surface of arithmetic genus d 1. Applications include Nielsen realization theorems for Md. By combining this with known results, we obtain the following remarkable consequence: if the singular fibers of such an elliptic fibration are of the simplest (i. e. \ nodal) type, then the fibered structure is unique up topological isotopy. In particular, any diffeomorphism of Md, d 3 is topologically isotopic to a diffeomorphism taking fibers to fibers.