Flops and Mordell-Weil group of Elliptic Threefolds with (4,6,12)-singular fibers

Abstract

Let f: W → T be an elliptic threefold that is a Weierstrass model, which is locally defined by y2 = x3 + fx + g over T, with a singular fiber such that (f,g,4f3 + 27g2) vanishes of order (4,6,12) over an isolated point over T. Such a fiber can be explicitly resolved to fibers with smaller vanishing order and the resulting model, Y, contains a rational elliptic surface, S, where some sections of S are flopping curves on Y. As a consequence of this arithmetic and geometric connection, we are able to describe some constraints between flops of Y and the properties of the Mordell-Weil group of S and Y.