The volume element of space-time and scale invariance
Abstract
Scale invariance is considered in the context of gravitational theories where the action, in the first order formalism, is of the form S = ∫ L1 d4x + ∫ L2-gd4x where the volume element d4x is independent of the metric. For global scale invariance, a "dilaton" φ has to be introduced, with non-trivial potentials V(φ) = f1eαφ in L1 and U(φ) = f2e2αφ in L2. This leads to non-trivial mass generation and a potential for φ which is interesting for inflation. Interpolating models for natural transition from inflation to a slowly accelerated universe at late times appear naturally. This is also achieved for "Quintessential models", which are scale invariant but formulated with the use of volume element d4x alone. For closed strings and branes (including the supersymmetric cases), the modified measure formulation is possible and does not require the introduction of a particular scale (the string or brane tension) from the begining but rather these appear as integration constants.
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