A universal Torelli theorem for elliptic surfaces
Abstract
Given two semistable, non potentially isotrivial elliptic surfaces over a curve defined over a field of characteristic zero or finitely generated over its prime field, we show that any compatible family of effective isometries of the N{\'e}ron-Severi lattices of the base changed elliptic surfaces for all finite separable maps arises from an isomorphism of the elliptic surfaces. Without the effectivity hypothesis, we show that the two elliptic surfaces are isomorphic. We also determine the group of universal automorphisms of a semistable elliptic surface. In particular, this includes showing that the Picard-Lefschetz transformations corresponding to an irreducible component of a singular fibre, can be extended as universal isometries. In the process, we get a family of homomorphisms of the affine Weyl group associated to to that of , indexed by natural numbers , which are closed under composition.
Cite
@article{arxiv.1706.00564,
title = {A universal Torelli theorem for elliptic surfaces},
author = {C. S. Rajan and S. Subramanian},
journal= {arXiv preprint arXiv:1706.00564},
year = {2017}
}
Comments
42 pages, Revised, minor modifications, correcting typos