Nonsingular, lump-like, scalar compact objects in (2+1)-dimensional Einstein gravity
Abstract
We study the space-time geometry generated by coupling a free scalar field with a non-canonical kinetic term to General Relativity in (2+1) dimensions. After identifying a family of scalar Lagrangians that yield exact analytical solutions in static and circularly symmetric scenarios, we classify the various types of solutions and focus on a branch that yields asymptotically flat geometries. We show that the solutions within such a branch can be divided in two types, namely, naked singularities and nonsingular objects without a center. In the latter, the energy density is localized around a maximum and vanishes only at infinity and at an inner boundary. This boundary has vanishing curvatures and cannot be reached by any time-like or null geodesic in finite affine time. This allows us to consistently interpret such solutions as nonsingular, lump-like, static compact scalar objects, whose eventual extension to the (3+1)-dimensional context could provide structures of astrophysical interest.
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