Some minisuperspace model for the Faddeev formulation of gravity

Abstract

We consider Faddeev formulation of general relativity in which the metric is composed of ten vector fields or a 4 × 10 tetrad. This formulation reduces to the usual general relativity upon partial use of the field equations. A distinctive feature of the Faddeev action is its finiteness on the discontinuous fields. This allows to introduce its minisuperspace formulation where the vector fields are constant everywhere on I -3pt R4 with exception of a measure zero set (the piecewise constant fields). The fields are parameterized by their constant values independently chosen in, e. g., the 4-simplices or, say, parallelepipeds into which I -3pt R4 can be decomposed. The form of the action for the vector fields of this type is found. We also consider the piecewise constant vector fields approximating the fixed smooth ones. We check that if the regions in which the vector fields are constant are made arbitrarily small, the minisuperspace action and eqs of motion tend to the continuum Faddeev ones.