Submaximally symmetric c-projective structures
Abstract
C-projective structures are analogues of projective structures in the complex setting. The maximal dimension of the Lie algebra of c-projective symmetries of a complex connection on an almost complex manifold of C-dimension is classically known to be . We prove that the submaximal dimension is equal to . If the complex connection is minimal (encoded as a normal parabolic geometry), the harmonic curvature of the c-projective structure has three components and we specify the submaximal symmetry dimensions and the corresponding geometric models for each of these three pure curvature types. If the connection is non-minimal, we introduce a modified normalization condition on the parabolic geometry and use this to resolve the symmetry gap problem. We prove that the submaximal symmetry dimension in the class of Levi-Civita connections for pseudo-K\"ahler metrics is , and specializing to the K\"ahler case, we obtain . This resolves the symmetry gap problem for metrizable c-projective structures.
Cite
@article{arxiv.1504.06967,
title = {Submaximally symmetric c-projective structures},
author = {Boris Kruglikov and Vladimir Matveev and Dennis The},
journal= {arXiv preprint arXiv:1504.06967},
year = {2017}
}
Comments
The manuscript was updated and revised. This version corrects some errors in Section 4 that do not influence the main results. The exposition is also slightly polished