Scalar wormholes with nonminimal derivative coupling

Abstract

We consider static spherically symmetric wormhole configurations in a gravitational theory of a scalar field with a potential V(φ) and nonminimal derivative coupling to the curvature describing by the term (ε gμ + Gμ) φ,μφ, in the action. We show that the flare-out conditions providing the geometry of a wormhole throat could fulfilled both if ε=-1 (phantom scalar) and ε=+1 (ordinary scalar). Supposing additionally a traversability, we construct numerical solutions describing traversable wormholes in the model with arbitrary , ε=-1 and V(φ)=0 (no potential). The traversability assumes that the wormhole possesses two asymptotically flat regions with corresponding Schwarzschild masses. We find that asymptotical masses of a wormhole with nonminimal derivative coupling could be positive and/or negative depending on . In particular, both masses are positive only provided <10, otherwise one or both wormhole masses are negative. In conclusion, we give qualitative arguments that a wormhole configuration with positive masses could be stable.