English

Two dimensional Sen connections in general relativity

General Relativity and Quantum Cosmology 2010-04-06 v1

Abstract

The two dimensional version of the Sen connection for spinors and tensors on spacelike 2-surfaces is constructed. A complex metric γAB\gamma_{AB} on the spin spaces is found which characterizes both the algebraic and extrinsic geometrical properties of the 2-surface \ .ThecurvatureofthetwodimensionalSenoperator. The curvature of the two dimensional Sen operator \Delta_eisthepullbackto is the pull back to $ oftheantiselfdualpartofthespacetimecurvaturewhileitstorsionisaboostgaugeinvariantexpressionoftheextrinsiccurvaturesof of the anti-self-dual part of the spacetime curvature while its `torsion' is a boost gauge invariant expression of the extrinsic curvatures of $ .Thedifferenceofthe2dimensionalSenandtheinducedspinconnectionsistheantiselfdualpartofthetorsion.Theirreduciblepartsof. The difference of the 2 dimensional Sen and the induced spin connections is the anti-self-dual part of the `torsion'. The irreducible parts of \Delta_e$ are shown to be the familiar 2-surface twistor and the Weyl--Sen--Witten operators. Two Sen--Witten type identities are derived, the first is an identity between the 2 dimensional twistor and the Weyl--Sen--Witten operators and the integrand of Penrose's charge integral, while the second contains the `torsion' as well. For spinor fields satisfying the 2-surface twistor equation the first reduces to Tod's formula for the kinematical twistor.

Keywords

Cite

@article{arxiv.gr-qc/9402001,
  title  = {Two dimensional Sen connections in general relativity},
  author = {L. B. Szabados},
  journal= {arXiv preprint arXiv:gr-qc/9402001},
  year   = {2010}
}

Comments

14 pages, Plain Tex, no report number