The Nielsen realization problem for K3 surfaces
Abstract
The smooth (resp. metric and complex) Nielsen Realization Problem for K3 surfaces asks: when can a finite group of mapping classes of be realized by a finite group of diffeomorphisms (resp. isometries of a Ricci-flat metric, or automorphisms of a complex structure)? We solve the metric and complex versions of Nielsen Realization, and we solve the smooth version almost completely for involutions. Unlike the case of -manifolds, some are realizable and some are not, and the answer depends on the category of structure preserved. In particular, Dehn twists are not realizable by finite order diffeomorphisms. We introduce a computable invariant that determines in many cases whether is realizable or not, and apply this invariant to construct an action by isometries of some Ricci-flat metric on that preserves no complex structure. We also show that the subgroups of of a given prime order which fix pointwise some positive-definite -plane in and preserve some complex structure on form a single conjugacy class in (it is known that then ).
Keywords
Cite
@article{arxiv.2104.08187,
title = {The Nielsen realization problem for K3 surfaces},
author = {Benson Farb and Eduard Looijenga},
journal= {arXiv preprint arXiv:2104.08187},
year = {2022}
}
Comments
38 pages, 1 figure. To appear in Journal of Differential Geometry (JDG)