On a global conformal invariant of initial data sets
Abstract
In the present paper a global conformal invariant Y of a closed initial data set is constructed. A spacelike hypersurface in a Lorentzian spacetime naturally inherits from the spacetime metric a differentiation De, the so-called real Sen connection, which turns out to be determined completely by the initial data hab and ab induced on , and coincides, in the case of vanishing second fundamental form ab, with the Levi-Civita covariant derivation De of the induced metric hab. Y is built from the real Sen connection De in the similar way as the standard Chern-Simons invariant is built from De. The number Y is invariant with respect to changes of hab and ab corresponding to conformal rescalings of the spacetime metric. In contrast the quantity Y built from the complex Ashtekar connection is not invariant in this sense. The critical points of our Y are precisely the initial data sets which are locally imbeddable into conformal Minkowski space.
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