E. J. Vlachynsky scite author profile

The spacetime of the metric-affine gauge theory of gravity (MAG) encompasses nonmetricity Q αβ and torsion T α as post-Riemannian structures. The sources of MAG are the conserved currents of energy-momentum and dilation ⊕ shear ⊕ spin. We present an exact static spherically symmetric vacuum solution of the theory describing the exterior of a lump of matter carrying mass and dilation ⊕ shear ⊕ spin charges.

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An axially symmetric solution of metric-affine gravity

Vlachynsky¹,

Tresguerres²,

Obukhov³

et al. 1996

Class. Quantum Grav.

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We present an exact stationary axially symmetric vacuum solution of metric-affine gravity (MAG) which generalises the recently reported spherically symmetric solution. Besides the metric, it carries nonmetricity and torsion as post-Riemannian geometrical structures. The parameters of the solution are interpreted as mass and angular momentum and as dilation, shear and spin charges.1 The geometry of MAG ('metric-affine gravity') is described by the curvature two-form R α β , the nonmetricity one-form Q αβ , and the torsion two-form T α which are the gravitational field strengths for linear connection, metric and coframe, respectively. The corresponding physical sources are the canonical energy-momentum and hypermomentum three-forms. The

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Einstein-Proca model: spherically symmetric solutions

Obukhov¹,

Vlachynsky²

1999

Ann. Phys.

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The Proca wave equation describes a classical massive spin 1 particle. We analyze the gravitational interaction of this vector field. In particular, the spherically symmetric solutions of the Einstein-Proca coupled system are obtained numerically. Although at infinity the metric field approaches the usual Schwarzschild (Reissner-Nordstro È m) limit, we demonstrate the absence of black hole type configurations.

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A nonnull electrovac solution in nonsymmetric gravitational theory. I

Vlachynsky¹

1993

Class. Quantum Grav.

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Anholonomic frames are employed to derive an electrovac solution with nonnull electromagnetic field in Moffat's nonsymmetric gravitational theory. It is shown that, in the limit g/sub / mu v// to 0, this solution reduces to the Einstein-Maxwell solution discussed by McIntosh. The author's solution, like its Einstein-Maxwell limit, has the property that the electromagnetic field does not admit the Killing vector field, xi , admitted by the symmetric part of the fundamental tensor. On the other hand, the antisymmetric part of the fundamental tensor does admit xi .

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E. J. Vlachynsky

Effective Einstein theory from metric-affine gravity models via irreducible decompositions

An exact solution of the metric-affine gauge theory with dilation, shear, and spin charges

An axially symmetric solution of metric-affine gravity

Einstein-Proca model: spherically symmetric solutions

A nonnull electrovac solution in nonsymmetric gravitational theory. I

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