Local rigidity of Einstein 4-manifolds satisfying a chiral curvature condition

Fine, Joel; Krasnov, Kirill; Singer, Michael

doi:10.1007/s00208-020-02097-z

Local rigidity of Einstein 4-manifolds satisfying a chiral curvature condition

Fine, Joel; Krasnov, Kirill; Singer, Michael

Authors

Joel Fine

Professor KIRILL KRASNOV kirill.krasnov@nottingham.ac.uk
PROFESSOR OF MATHEMATICAL SCIENCES

Michael Singer

Abstract

Let (M, g) be a compact oriented Einstein 4-manifold. Write R+ for the part of the curvature operator of g which acts on self-dual 2-forms. We prove that if R+ is negative definite then g is locally rigid: any other Einstein metric near to g is isometric to it. This is a chiral generalisation of Koiso’s Theorem, which proves local rigidity of Einstein metrics with negative sectional curvature. Our hypotheses are roughly one half of Koiso’s. Our proof uses a new variational description of Einstein 4-manifolds, as critical points of the so-called pure connection action S. The key step in the proof is that when R+

Citation

Fine, J., Krasnov, K., & Singer, M. (2020). Local rigidity of Einstein 4-manifolds satisfying a chiral curvature condition. Mathematische Annalen, 379, 569–588. https://doi.org/10.1007/s00208-020-02097-z

Journal Article Type	Article
Acceptance Date	Oct 6, 2020
Online Publication Date	Oct 14, 2020
Publication Date	Oct 14, 2020
Deposit Date	Oct 16, 2020
Publicly Available Date	Oct 15, 2021
Journal	Mathematische Annalen
Print ISSN	0025-5831
Electronic ISSN	1432-1807
Publisher	Springer Verlag
Peer Reviewed	Peer Reviewed
Volume	379
Pages	569–588
DOI	https://doi.org/10.1007/s00208-020-02097-z
Public URL	https://nottingham-repository.worktribe.com/output/4967702
Publisher URL	https://link.springer.com/article/10.1007/s00208-020-02097-z