On the stress tensor of conformal field theories in higher dimensions

The behaviour of the stress tensor under conformal transformations of both flat and curved spaces is investigated for free theories in a classical background metric. In flat space ℝ d it is derived by the operator product expansion of two stress tensors. For Weyl transformations of curved manifolds...

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Bibliographic Details
Published inNuclear physics. B Vol. 314; no. 3; pp. 707 - 740
Main Authors Cappelli, Andrea, Coste, Antoine
Format Journal Article
LanguageEnglish
Published Amsterdam Elsevier B.V 06.03.1989
Elsevier
Subjects
Classical and quantum physics: mechanics and fields
Exact sciences and technology
Physics
Theory of quantized fields
Operator product
Effective potential
Stress tensor
Conformal transformation
Central charge
Trace
Conformal theory
Partition function
Manifold
Two dimension theory
Series expansion
Interaction potential
Anomaly
Metric
Quantum field theory
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Summary:The behaviour of the stress tensor under conformal transformations of both flat and curved spaces is investigated for free theories in a classical background metric. In flat space ℝ d it is derived by the operator product expansion of two stress tensors. For Weyl transformations of curved manifolds it is given by the effective potential for the metric. In four dimensions the general form of the potential and its consistency conditions are analysed. These issues are relevant for the possible generalizations of the central charge in higher dimensions. The related subject of the Casimir effect is studied by means of closed expressions for the bosonic partition function on the manifoldsT d and S 1 ×S d−1 . The general relationship between the Casimir effect on ℝ×S d−1 and the trace anomaly is emphasized.
ISSN:0550-3213
1873-1562
DOI:10.1016/0550-3213(89)90414-8