Variational techniques in general relativity: A metric-affine approach to Kaluza's theory
Abstract
A new variational principle for General Relativity, based on an action functional I\/(,∇)\/ involving both the metric \/ and the connection ∇\/ as independent, unconstrained\/ degrees of freedom is presented. The extremals of I\/ are seen to be pairs \/(,∇)\/ in which \/ is a Ricci flat metric, and ∇\/ is the associated Riemannian connection. An application to Kaluza's theory of interacting gravitational and electromagnetic fields is discussed.
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