Massive NGT and spherically symmetric systems

Clayton, M. A.

doi:10.1063/1.531397

Cited by 18 publications

(43 citation statements)

References 34 publications

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“…In this paper, for simplicity, we shall work with a general d-connection D which is compatible toǧ, i.e. satisfies the conditions (37), or (36), and can be generated by a distorsion tensor B from D (39), or from n D (35). We note that for certain canonical constructions the d-objects D, • D, D, n D and B are completely defined by the coefficients of a d-metricǧ = g + a and N on V.…”

Section: On Geometry Of N-anholonomic Manifoldsmentioning

confidence: 99%

“…The authors agreed that one can be elaborated such models with nonzero mass term for the nonsymmetric part of metric (treated as an absolutely symmetric torsion induced by an effective B-field like in string gravity, but in four dimensions). That solved the problems formally created by absence of gauge invariance found by Damour, Deser and McCarthy [34], see explicit constructions and detailed discussions in [23,35]. It was also emphasized that, as a matter of principle, the 1 A pair (V, N ), where V is a manifold and N is a nonintegrable distribution on V, is called a nonholonomic manifold; we note that in our works we use left "up" and "low" symbols as formal labels for certain geometric objects and that the spacetime signature may be encoded into formal frame (vielbein) coefficients, some of them being proportional to the imaginary unity i, when i 2 = −1.…”

Section: Introductionmentioning

confidence: 94%

“…One should be noted that in a number of works on gravity with nonsymmetric metrics the short term NGT is used [35,36] (instead of nonsymmetric gravity theory/-ies, see details in [22][23][24]38]). This may result in some misunderstanding with the "noncommutative gravity theory" developed in some approaches to noncommutative geometry and applications.…”

Section: Introductionmentioning

confidence: 99%

See 2 more Smart Citations

Einstein Gravity in Almost Kähler Variables and Stability of Gravity with Nonholonomic Distributions and Nonsymmetric Metrics

Vacaru

2009

Int J Theor Phys

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We argue that the Einstein gravity theory can be reformulated in almost Kähler (nonsymmetric) variables with effective symplectic form and compatible linear connection uniquely defined by a (pseudo) Riemannian metric. A class of nonsymmetric theories of gravitation on manifolds enabled with nonholonomic distributions is considered. We prove that, for certain types of nonholonomic constraints, there are modelled effective Lagrangians which do not develop instabilities. It is also elaborated a linearization formalism for anholonomic noncommutative gravity theories models and analyzed the stability of stationary ellipsoidal solutions defining some nonholonomic and/or nonsymmetric deformations of the Schwarzschild metric. We show how to construct nonholonomic distributions which remove instabilities in nonsymmetric gravity theories. It is concluded that instabilities do not consist a general feature of theories of gravity with nonsymmetric metrics but a particular property of some models and/or unconstrained solutions.

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Section: On Geometry Of N-anholonomic Manifoldsmentioning

confidence: 99%

Section: Introductionmentioning

confidence: 94%

Section: Introductionmentioning

confidence: 99%

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Einstein Gravity in Almost Kähler Variables and Stability of Gravity with Nonholonomic Distributions and Nonsymmetric Metrics

Vacaru

2009

Int J Theor Phys

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“…Here we will give the (coordinate frame) action for NGT as presented in [12] S ngt = d 4 x √ −g −g µν R ns µν − g µν ∇ [µ [W ] ν] + 1 2 αg µν W µ W ν + l µ Λ µ + 1 4 µ 2 g [µν] g [µν] . (2.1)…”

Section: The Wyman Sector Field Equationsmentioning

confidence: 99%

“…The action (2.1) and field equations (2.3) and (2.4) encompass those of the 'massive' theory [13,12,14,15] when α = 3/4, 'old' NGT [2] with vanishing source current for α = 0 and µ = 0 (which is equivalent to UFT [16,3]), and recovers GR in the limit that all antisymmetric components of the fundamental tensor are set to zero [12,17]. The general form of the spherically-symmetric fundamental tensor [18] consists of the general form of a spherically symmetric metric with the additional antisymmetric components g [01] = ω(t, r) and g [23] = f (t, r) sin(θ); in this work we consider the Wyman sector [4,5] defined by choosing g [01] = 0.…”

Section: The Wyman Sector Field Equationsmentioning

confidence: 99%

The Dynamical Instability of Static, Spherically Symmetric Solutions in Nonsymmetric Gravitational Theories

Clayton¹,

Demopoulos²,

Légaré³

1998

General Relativity and Gravitation

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We consider the dynamical stability of a class of static, spherically-symmetric solutions of the nonsymmetric gravitational theory. We numerically reproduce the Wyman solution and generate new solutions for the case where the theory has a nontrivial fundamental length scale µ −1 . By considering spherically symmetric perturbations of these solutions we show that the Wyman solutions are generically unstable.

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Nonassociative Geometry of Nonholonomic Phase Spaces with Star R‐flux String Deformations and (non) Symmetric Metrics

Vacaru

Veliev

Bubuianu³

2021

Fortschritte der Physik

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We elaborate on nonassociative differential geometry of phase spaces endowed with nonholonomic (non-integrable) distributions and frames, nonlinear and linear connections, symmetric and nonsymmetric metrics, and correspondingly adapted quasi-Hopf algebra structures. The approach is based on the concept of nonassociative star product introduced for describing closed strings moving in a constant R-flux background. Generalized Moyal-Weyl deformations are considered when, for nonassociative and noncommutative terms of star deformations, there are used nonholonomic frames (bases) instead of local partial derivatives. In such modified nonassociative and nonholonomic spacetimes and associated complex/real phase spaces, the coefficients of geometric and physical objects depend both on base spacetime coordinates and conventional (co) fiber velocity/momentum variables like in (non) commutative Finsler-Lagrange-Hamilton geometry. For nonassociative and (non) commutative phase spaces modelled as total spaces of (co) tangent bundles on Lorentz manifolds enabled with star products and nonholonomic frames, we consider associated nonlinear connection, N-connection, structures determining conventional horizontal and (co) vertical (for instance, 4+4) splitting of dimensions and N-adapted decompositions of fundamental geometric objects. There are defined and computed in abstract geometric and N-adapted coefficient forms the torsion, curvature and Ricci tensors. We extend certain methods of nonholonomic geometry in order to construct R-flux deformations of vacuum Einstein equations for the case of N-adapted linear connections and symmetric and nonsymmetric metric structures. Introduction, Motivations and GoalsWe initialize a research on nonassociative nonholonomic geometry induced by R-flux backgrounds in string gravity and classical and quantum models on phase spaces modelled as (co) tangent Lorentz bundles endowed with nonholonomic (non-integrable, equivalently, anholonomic) structures and nonsymmetric metrics. Such a nonholonomic geometric formalism was elaborated for various types of (non) commutative gravity and matter field theories, modified (relativistic) geometric flows, and classical and quantum information theories, see details in a series of our previous works [1][2][3][4][5][6][7][8][9][10][11] and references therein. In this article, nonassociative geometric and physical models are formulated in a form which is accessible to researchers in particle physics and modern cosmology. There are provided nonholonomic generalizations of two recent models of nonassociative geometry and vacuum gravity due to [12] and, with

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Massive NGT and spherically symmetric systems

Cited by 18 publications

References 34 publications

Einstein Gravity in Almost Kähler Variables and Stability of Gravity with Nonholonomic Distributions and Nonsymmetric Metrics

Einstein Gravity in Almost Kähler Variables and Stability of Gravity with Nonholonomic Distributions and Nonsymmetric Metrics

The Dynamical Instability of Static, Spherically Symmetric Solutions in Nonsymmetric Gravitational Theories

Nonassociative Geometry of Nonholonomic Phase Spaces with Star R‐flux String Deformations and (non) Symmetric Metrics

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