Metric-Like Formalism for Matter Fields Coupled to 3D Higher Spin Gravity

Abstract

Action integral for a matter system composed of 0- and 2-forms, C and Bμ, topologically coupled to 3D spin-3 gravity is considered first in the frame-like formalism. The field C satisfies an eq of motion, ∂μ \, C+Aμ \, C-C \, Aμ=0. With a suitable gauge fixing of a new local symmetry and diffeomorphism, only one component of Bμ, say Bφ r, remains non-vanishing and satisfies an equation similar to that for C with Aμ and Aμ interchanged. The spin connection is eliminated by solving the eq of motion for the total action, and in the resulting metric-like formalism, (BC)2 interaction terms are induced because of the torsion. The world-volume components of the matter field, C0, Cμ and C(μ), are introduced by contracting the local-frame index of C with those of the inverse vielbeins, Eaμ and Ea(μ), which were defined by the present authors in ArXiv:1209.0894 [hep-th]. The metric-like fields, as well as the new connections and the generalized curvature tensors, introduced in the above mentioned paper, are explicitly expressed in terms of the metric gμ and the spin-3 field φμλ by means of the φ-expansion. The action integral for the pure spin-3 gravity in the metric-like formalism up to O(φ2), obtained before in the literature, is re-derived. Then the matter action is re-expressed in terms of gμ, φμ and the covariant derivatives for spin-3 geometry. Spin-3 gauge transformation is extended to the matter fields.