Complex quaternionic manifolds and c-projective structures
Abstract
We discuss complex quaternionic manifolds, i.e., those that have holonomy GL(n,H)U(1), which naturally arise via quaternionic Feix--Kaledin construction. We show that for a fixed c-projective class, any real analytic connection with type (1,1) curvature induces, via quaternionic Feix--Kaledin construction, an S1-invariant connection with holonomy contained in GL(n,H)U(1). As an application, we characterize in this setting the distinguished U*(2n):=SL(n,H)U(1) connection studied in Battaglia Bat and Hitchin Hit3.
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