On dual properties of the weyl tensor springerlink. To conclude our classification of the weyl tensors wx at points x of arbitrary. In differential geometry, the weyl curvature tensor, named after hermann weyl, is a measure of. The algebraic behaviour of the weyl tensor in the geometrical optics approximation angelo marcello anile 1 annali di matematica pura ed applicata volume 109, pages 357. Straub,phd pasadena,california april14,2006 theriemann. I know the author as a research scholar who has worked with me for several years. Bianchi identities for the riemann and weyl tensors. Bertschinger and hamilton derive equations for the electric and magnetic parts of the weyl tensor for cold dust for both general.
With this in mind, in this paper we derive higherorder. Weyl tensor classification in fourdimensional manifolds. It gives me great pleasure to write the foreword to dr. A tensor with the symmetries of the curvature tensor such that all contractions on its indices vanish. Motivation g r 1 2 rg t i algebraic equations for the traces of the riemann tensor i determine 10 components of the riemann tensor i no direct visibility of curvature propagation traceless part of r is the weyl tensor, c. Electric and magnetic parts of the weyl tensor and spin coefficients. Weyl tensor or projective curvature tensor 104 examples. Pdf vanishing conditions on weyl tensor for einstein.
We compute the evolution equation of the weyl tensor under the ricci. Dg 1 oct 20 the evolution of the weyl tensor under the ricci flow giovanni catino and carlo mantegazza abstract. Thus, all the geometry of an einstein metric g is encoded in its weyl tensor w and, obviously, in the constant r. The purpose of this paper is to revisit the bianchi identities existing for the riemann and weyl tensors in the combined framework of the formal theory of systems of partial differential equations spencer cohomology, differential. The lanczos potential for the weyl curvature tensor citeseerx. Weyl tensor article about weyl tensor by the free dictionary. We recall that the weyl tensor whas the same symmetries. Bianchi identities for the riemann and weyl tensors arxiv. The very definition of an einstein metric implies that all its geometry is encoded in the weyl tensor. Differential geometry weyl tensor triple product dual property. Pdf electric and magnetic weyl tensors researchgate. Simple derivation of the weyl conformal tensor williamo. For the weyl tensor in four dimensions it is established that this last approach produces a classification equivalent to the one generated by the bivector method. Nazrul islams book entitled tensors and their applications.
Andrzej derdzinski, in handbook of differential geometry, 2000. The weyl tensor c is expressible in terms of the riemann, ricci and scalar curvature tensor cf. To conclude our classification of the weyl tensors wx at points x of arbitrary pseudoriemannian 4manifolds m, g, let us again replace t x m and the metric g x by a 4space t with an inner product. Moreover, the special form of riemnaturally restricts the class of admissible weyl type tensors see 9,12,1. Weyl curvature tensor of the background vacuum spacetime. This result is used to prove that the form of a possible lanczos potential recently proposed by. The kummer tensor density in electrodynamics and in gravity. Ricci and schouten tensors required to insure conformal invariance.