Differential geometry of SO(2n)-type structures

Abstract

We study 4n-dimensional smooth manifolds admitting a SO*(2n)- or a SO*(2n)Sp(1)-structure, where SO*(2n) is the quaternionic real form of SO(2n, C). We show that such G-structures, called almost hypercomplex/quaternionic skew-Hermitian structures, form the symplectic analogue of the better known almost hypercomplex/quaternionic-Hermitian structures (hH/qH for short). We present several equivalent definitions of SO*(2n)- and SO*(2n)Sp(1)-structures in terms of almost symplectic forms compatible with an almost hypercomplex/quaternionic structure, a quaternionic skew-Hermitian form, or a symmetric 4-tensor, the latter establishing the counterpart of the fundamental 4-form in almost hH/qH geometries. The intrinsic torsion of such structures is presented in terms of Salamon's EH-formalism, and the algebraic types of the corresponding geometries are classified. We construct explicit adapted connections to our G-structures and specify certain normalization conditions, under which these connections become minimal. Finally, we present the classification of symmetric spaces K/L with K semisimple admitting an invariant torsion-free SO*(2n)Sp(1)-structure. This paper is the first in a series aiming at the description of the differential geometry of SO*(2n)- and SO*(2n)Sp(1)-structures.