On certain global conformal invariants and 3-surface twistors of initial data sets

Abstract

The Chern-Simons functionals built from various connections determined by the initial data hμ, μ on a 3-manifold are investigated. First it is shown that for asymptotically flat data sets the logarithmic fall-off for hμ and rμ is the necessary and sufficient condition of the existence of these functionals. The functional Yk,l, built in the vector bundle corresponding to the irreducible representation of SL(2,C) labelled by (k,l), is shown to be determined by the Ashtekar-Chern-Simons functional and its complex conjugate. Yk,l is conformally invariant precisely in the l=k (i.e. tensor) representations. An unexpected connection with twistor theory is found: Yk,k can be written as the Chern-Simons functional built from the 3-surface twistor connection, and the not identically vanishing spinor parts of the 3-surface twistor curvature are given by the variational derivatives of Yk,k with respect to hμ and μ. The time derivative Yk,k of Yk,k is another conformal invariant of the initial data set, and for vanishing Yk,k, in particular for all Petrov III and N spacetimes, the Chern-Simons functional is a conformal invariant of the whole spacetime.

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