The Static Cylinder, Gyroscopes and the C-Metric

Herrera, L.; Ruifernández, J.; Santos, N. O.

doi:10.1023/a:1010296808194

Cited by 16 publications

(25 citation statements)

References 23 publications

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“…The existence and uniqueness of global solutions are shown for rather general fluid EoS admitting nonvanishing density at zero pressure. In [188], it is shown that conformally flat internal solutions cannot be matched to an LC exterior.…”

Section: Some Further Resultsmentioning

confidence: 99%

Cylindrical systems in general relativity

Бронников

Santos

Wang

2020

Class. Quantum Grav.

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With the arrival of the era of gravitational wave astronomy, the strong gravitational field regime will be explored soon in various aspects. In this article, we provide a general review over cylindrical systems in Einstein's theory of general relativity. In particular, we first review the general properties, both local and global, of several important solutions of Einstein's field equations, including the Levi-Civita and Lewis solutions and their extensions to include the cosmological constant and matter fields, and pay particular attention to properties that represent the generic features of the theory, such as the formation of the observed extragalactic jets and gravitational Faraday rotation. We also review studies of cylindrical wormholes, gravitational collapse and Hoop conjecture, and polarizations of gravitational waves. In addition, by rigorously defining cylindrically symmetric spacetimes, we clarify various (incorrect) claims existing in the literature, regarding to the generality of such spacetimes.

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Section: Some Further Resultsmentioning

confidence: 99%

Cylindrical systems in general relativity

Бронников

Santos

Wang

2020

Class. Quantum Grav.

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“…On the other hand, one can interpret the metric with σ = −1/2 as the gravitational field produced by an infinite sheet of negative mass density (an idea also first proposed by Gautreau and Hoffmann [18]). However, this case is also problematic [15,17,16]. The metric…”

Section: Levi-civita Spacetimesmentioning

confidence: 99%

“…The interpretation of this spacetime as one caused by an infinite plane of negative mass density comes from the fact that test particles are repelled from the r = 0 plane and the fact that "the Gaussian curvature of spacelike 'eigensurfaces' is zero" [18]. This is a reasonable interpretation; the "problem" comes from interpreting both σ = 1/2 and σ = −1/2 as planes of infinite (positive/negative) mass density as one is singularity-free and the other has a curvature singularity [17,16]. We will now study the quantum singularity properties of these spacetimes for various parameter values in the following sections.…”

Section: Levi-civita Spacetimesmentioning

confidence: 99%

Quantum singularity of Levi-Civita spacetimes

Konkowski¹,

Helliwell²,

Wieland³

2003

Class. Quantum Grav.

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Abstract. Quantum singularities in general relativistic spacetimes are determined by the behavior of quantum test particles. A static spacetime is quantum mechanically singular if the spatial portion of the wave operator is not essentially self-adjoint. Here Weyl's limit point-limit circle criterion is used to determine whether a wave operator is essentially self-adjoint. This test is then applied to scalar wave packets in Levi-Civita spacetimes to help elucidate the physical properties of the spacetimes in terms of their metric parameters.

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“…On the other hand, since Ω i describes the rate of rotation with respect to the proper time at any point at rest in the rotating frame, relative to the local compass of inertia, then −Ω i describes the rotation of the compass of inertia (the gyroscope) with respect to the rotating frame. Applying (9) to the original frame of (1), with t = t ′ , r = r ′ and z = z ′ , we cast (1) into the canonical form (10), and obtain (see (43) in [5])…”

Section: Precession Of a Gyroscope Moving In A Circle Around The Axis...mentioning

confidence: 99%