On generalized imaginary Spinc-Killing spinors

Abstract

A non-trivial spinor field is called a generalized imaginary Spinc-Killing spinor if ∇g,A X = iμ X · for all vector fields X, where μ is a real function that is not identically zero and ∇g,A is the Spinc Levi-Civita connection with U(1)-connection A. Associated with is a vector field V, the Dirac current, defined by g(V,X) = i X· , . We prove that if V vanishes somewhere and dim M ≥ 3, the manifold is locally isometric to real hyperbolic space. When V never vanishes and dim M ≥ 3, we obtain a global geometric description of all Spinc-Riemannian manifolds carrying such spinors, under the assumption that either the normalized Dirac current = V|V| is complete or the leaves of D = () are complete. Finally, we reinterpret the case of type~I generalized imaginary Spinc-Killing spinors in terms of parallel spinors for a suitable connection with vectorial torsion.