On Semi-isogenous mixed surfaces
Abstract
Let be a smooth projective curve and a finite subgroup of whose action is \textit{mixed}, i.e.~there are elements in exchanging the two isotrivial fibrations of . Let be the index two subgroup . If acts freely, then is smooth and we call it \textit{semi-isogenous mixed surface}. In this paper we give an algorithm to determine semi-isogenous mixed surfaces with given geometric genus, irregularity and self-intersection of the canonical class. As an application we classify irregular semi-isogenous mixed surfaces with and geometric genus equal to the irregularity; the regular case is subjected to some computational restrictions. In this way we construct new examples of surfaces of general type with . We provide an example of a minimal surface of general type with and .
Cite
@article{arxiv.1510.09055,
title = {On Semi-isogenous mixed surfaces},
author = {Nicola Cancian and Davide Frapporti},
journal= {arXiv preprint arXiv:1510.09055},
year = {2017}
}
Comments
24 pages, 4 tables; v3: minor changes, final version to appear on Mathematische Nachrichten