English

The Nielsen realization problem for K3 surfaces

Geometric Topology 2022-04-21 v2 Algebraic Geometry Algebraic Topology

Abstract

The smooth (resp. metric and complex) Nielsen Realization Problem for K3 surfaces MM asks: when can a finite group GG of mapping classes of MM 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 22-manifolds, some GG 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 LGL_G that determines in many cases whether GG is realizable or not, and apply this invariant to construct an S4S_4 action by isometries of some Ricci-flat metric on MM that preserves no complex structure. We also show that the subgroups of Diff(M){\rm Diff}(M) of a given prime order pp which fix pointwise some positive-definite 33-plane in H2(M;R)H_2(M;\mathbb{R}) and preserve some complex structure on MM form a single conjugacy class in Diff(M){\rm Diff}(M) (it is known that then p{2,3,5,7}p\in \{2,3,5,7\}).

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)

R2 v1 2026-06-24T01:14:58.873Z