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A metric-affine version of the Horndeski theory

Thomas Helpin, Mikhail S. Volkov

2020International Journal of Modern Physics A17 citationsDOIOpen Access PDF

Abstract

We study the metric-affine versions of scalar-tensor theories whose connection enters the action only algebraically. We show that the connection can be integrated out, resulting in an equivalent metric theory. Specifically, we consider the metric-affine generalisations of the subset of the Horndeski theory whose action is linear in second derivatives of the scalar field. We determine the connection and find that it can describe a scalar-tensor Weyl geometry without a Riemannian frame. Still, as this connection enters the action algebraically, the theory admits the dynamically equivalent (pseudo)-Riemannian formulation in the form of an effective metric theory with an extra K-essence term. This may have interesting phenomenological applications.

Topics & Concepts

Connection (principal bundle)PhysicsMetric (unit)Action (physics)Theoretical physicsScalar (mathematics)Metric connectionEffective actionClassical mechanicsGravitationDifferential geometryPhenomenological modelMathematical physicsCosmology and Gravitation TheoriesBlack Holes and Theoretical PhysicsNoncommutative and Quantum Gravity Theories