Anti-quasi-Sasakian manifolds
Abstract
We introduce and study a special class of almost contact metric manifolds, which we call anti-quasi-Sasakian (aqS). Among the class of transversely K\"ahler almost contact metric manifolds (M,, ,η,g), quasi-Sasakian and anti-quasi-Sasakian manifolds are characterized, respectively, by the -invariance and the -anti-invariance of the 2-form dη. A Boothby-Wang type theorem allows to obtain aqS structures on principal circle bundles over K\"ahler manifolds endowed with a closed (2,0)-form. We characterize aqS manifolds with constant -sectional curvature equal to 1: they admit an Sp(n)× 1-reduction of the frame bundle such that the manifold is transversely hyperk\"ahler, carrying a second aqS structure and a null Sasakian η-Einstein structure. We show that aqS manifolds with constant sectional curvature are necessarily flat and cok\"ahler. Finally, by using a metric connection with torsion, we provide a sufficient condition for an aqS manifold to be locally decomposable as the Riemannian product of a K\"ahler manifold and an aqS manifold with structure of maximal rank. Under the same hypothesis, (M,g) cannot be locally symmetric.
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