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Bach_tensor abstract "In differential geometry and general relativity, the Bach tensor is a trace-free tensor of rank 2 which is conformally invariant in dimension n = 4. Before 1968, it was the only known conformally invariant tensor that is algebraically independent of the Weyl tensor. In abstract indices the Bach tensor is given bywhere is the Weyl tensor, and the Schouten tensor given in terms of the Ricci tensor and scalar curvature by".
Bach_tensor wikiPageID "5784784".
Bach_tensor wikiPageRevisionID "584229886".
Bach_tensor hasPhotoCollection Bach_tensor.
Bach_tensor subject Category:Tensors.
Bach_tensor subject Category:Tensors_in_general_relativity.
Bach_tensor type Abstraction100002137.
Bach_tensor type Cognition100023271.
Bach_tensor type Concept105835747.
Bach_tensor type Content105809192.
Bach_tensor type Idea105833840.
Bach_tensor type PsychologicalFeature100023100.
Bach_tensor type Quantity105855125.
Bach_tensor type Tensor105864481.
Bach_tensor type Tensors.
Bach_tensor type TensorsInGeneralRelativity.
Bach_tensor type Variable105857459.
Bach_tensor comment "In differential geometry and general relativity, the Bach tensor is a trace-free tensor of rank 2 which is conformally invariant in dimension n = 4. Before 1968, it was the only known conformally invariant tensor that is algebraically independent of the Weyl tensor. In abstract indices the Bach tensor is given bywhere is the Weyl tensor, and the Schouten tensor given in terms of the Ricci tensor and scalar curvature by".
Bach_tensor label "Bach tensor".
Bach_tensor label "Тензор Баха".
Bach_tensor sameAs m.0f4f2q.
Bach_tensor sameAs Q4454675.
Bach_tensor sameAs Q4454675.
Bach_tensor sameAs Bach_tensor.
Bach_tensor wasDerivedFrom Bach_tensor?oldid=584229886.
Bach_tensor isPrimaryTopicOf Bach_tensor.