ON THE FIRST ORDER COVARIANT HAMILTONIAN FORMALISM ON GROUP MANIFOLD

By considering two explicit examples D=6 and D=11 supergravities we show the applicability, and check the validity of the first order canonical covariant formalism on group manifold. In each case we find the primary constraints, the total Hamiltonian and the field equations of motion. Moreover, we show how the Bianchi identities appear in the covariant Hamiltonian formalism.

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Actions, topological terms and boundaries in first-order gravity: A review

International Journal of Modern Physics D ◽

10.1142/s0218271816300111 ◽

2016 ◽

Vol 25 (04) ◽

pp. 1630011 ◽

Cited By ~ 19

Author(s):

Alejandro Corichi ◽

Irais Rubalcava-García ◽

Tatjana Vukašinac

Keyword(s):

Boundary Conditions ◽

Symplectic Structure ◽

Equations Of Motion ◽

Hamiltonian Formalism ◽

Action Principle ◽

Internal Boundary ◽

Four Dimensions ◽

First Order ◽

Conserved Charges ◽

Boundary Terms

In this review, we consider first-order gravity in four dimensions. In particular, we focus our attention in formulations where the fundamental variables are a tetrad [Formula: see text] and a [Formula: see text] connection [Formula: see text]. We study the most general action principle compatible with diffeomorphism invariance. This implies, in particular, considering besides the standard Einstein–Hilbert–Palatini term, other terms that either do not change the equations of motion, or are topological in nature. Having a well defined action principle sometimes involves the need for additional boundary terms, whose detailed form may depend on the particular boundary conditions at hand. In this work, we consider spacetimes that include a boundary at infinity, satisfying asymptotically flat boundary conditions and/or an internal boundary satisfying isolated horizons boundary conditions. We focus on the covariant Hamiltonian formalism where the phase space [Formula: see text] is given by solutions to the equations of motion. For each of the possible terms contributing to the action, we consider the well-posedness of the action, its finiteness, the contribution to the symplectic structure, and the Hamiltonian and Noether charges. For the chosen boundary conditions, standard boundary terms warrant a well posed theory. Furthermore, the boundary and topological terms do not contribute to the symplectic structure, nor the Hamiltonian conserved charges. The Noether conserved charges, on the other hand, do depend on such additional terms. The aim of this manuscript is to present a comprehensive and self-contained treatment of the subject, so the style is somewhat pedagogical. Furthermore, along the way, we point out and clarify some issues that have not been clearly understood in the literature.

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Spectrum of area in the Faddeev formulation of gravity

Modern Physics Letters A ◽

10.1142/s0217732316501145 ◽

2016 ◽

Vol 31 (19) ◽

pp. 1650114 ◽

Cited By ~ 1

Author(s):

V. M. Khatsymovsky

Keyword(s):

General Relativity ◽

Vector Fields ◽

Hamiltonian Formalism ◽

Black Hole Entropy ◽

Field Equations ◽

Piecewise Constant ◽

First Order ◽

Connection Matrices ◽

Order Representation ◽

Connection Type

Faddeev formulation of general relativity (GR) is considered where the metric is composed of ten vector fields or a ten-dimensional tetrad. Upon partial use of the field equations, this theory results in the usual general relativity (GR). Earlier, we have proposed first-order representation of the minisuperspace model for the Faddeev formulation where the tetrad fields are piecewise constant on the polytopes like four-simplices or, say, cuboids into which [Formula: see text] can be decomposed, an analogue of the Cartan–Weyl connection-type form of the Hilbert–Einstein action in the usual continuum GR. In the Hamiltonian formalism, the tetrad bilinears are canonically conjugate to the orthogonal connection matrices. We evaluate the spectrum of the elementary areas, functions of the tetrad bilinears. The spectrum is discrete and proportional to the Faddeev analog [Formula: see text] of the Barbero–Immirzi parameter [Formula: see text]. The possibility of the tetrad and metric discontinuities in the Faddeev gravity allows to consider any surface as consisting of a set of virtually independent elementary areas and its spectrum being the sum of the elementary spectra. Requiring consistency of the black hole entropy calculations known in the literature we are able to estimate [Formula: see text].

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Kinetic theory

10.1093/oso/9780198786399.003.0010 ◽

2018 ◽

Author(s):

Nathalie Deruelle ◽

Jean-Philippe Uzan

Keyword(s):

Distribution Function ◽

Kinetic Theory ◽

Liouville Equation ◽

Vlasov Equation ◽

Particle Distribution ◽

Equations Of Motion ◽

Poisson Brackets ◽

Hamiltonian Form ◽

First Order ◽

Number Of Particles

This chapter covers the equations governing the evolution of particle distribution and relates the macroscopic thermodynamical quantities to the distribution function. The motion of N particles is governed by 6N equations of motion of first order in time, written in either Hamiltonian form or in terms of Poisson brackets. Thus, as this chapter shows, as the number of particles grows it becomes necessary to resort to a statistical description. The chapter first introduces the Liouville equation, which states the conservation of the probability density, before turning to the Boltzmann–Vlasov equation. Finally, it discusses the Jeans equations, which are the equations obtained by taking various averages over velocities.

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Does general relativity highlight necessary connections in nature?

Synthese ◽

10.1007/s11229-020-03009-z ◽

2021 ◽

Author(s):

Antonio Vassallo

Keyword(s):

General Relativity ◽

Laws Of Nature ◽

Coupling Mechanism ◽

Einstein Field Equations ◽

Field Equations ◽

Bianchi Identities ◽

Physical Role ◽

General Relativistic ◽

Differential Relations ◽

Necessary Connections

AbstractThe dynamics of general relativity is encoded in a set of ten differential equations, the so-called Einstein field equations. It is usually believed that Einstein’s equations represent a physical law describing the coupling of spacetime with material fields. However, just six of these equations actually describe the coupling mechanism: the remaining four represent a set of differential relations known as Bianchi identities. The paper discusses the physical role that the Bianchi identities play in general relativity, and investigates whether these identities—qua part of a physical law—highlight some kind of a posteriori necessity in a Kripkean sense. The inquiry shows that general relativistic physics has an interesting bearing on the debate about the metaphysics of the laws of nature.

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On supersymmetric AdS4 orientifold vacua

Journal of High Energy Physics ◽

10.1007/jhep08(2020)087 ◽

2020 ◽

Vol 2020 (8) ◽

Cited By ~ 1

Author(s):

Fernando Marchesano ◽

Eran Palti ◽

Joan Quirant ◽

Alessandro Tomasiello

Keyword(s):

String Theory ◽

Cosmological Constant ◽

Bianchi Identities ◽

Expansion Parameter ◽

First Order ◽

Ricci Flat ◽

Key Features ◽

One To One ◽

Calabi Yau Manifolds

Abstract In this work we study ten-dimensional solutions to type IIA string theory of the form AdS4 × X6 which contain orientifold planes and preserve $$ \mathcal{N} $$ N = 1 supersymmetry. In particular, we consider solutions which exhibit some key features of the four-dimensional DGKT proposal for compactifications on Calabi-Yau manifolds with fluxes, and in this sense may be considered their ten-dimensional uplifts. We focus on the supersymmetry equations and Bianchi identities, and find solutions to these that are valid at the two-derivative level and at first order in an expansion parameter which is related to the AdS cosmological constant. This family of solutions is such that the background metric is deformed from the Ricci-flat one to one exhibiting SU(3) × SU(3)-structure, and dilaton gradients and warp factors are induced.

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On a non-symmetric theory of the pure gravitational field

Mathematical Proceedings of the Cambridge Philosophical Society ◽

10.1017/s030500410003320x ◽

1958 ◽

Vol 54 (1) ◽

pp. 72-80 ◽

Cited By ~ 30

Author(s):

D. W. Sciama

Keyword(s):

Gravitational Field ◽

Energy Momentum Tensor ◽

Equations Of Motion ◽

Rest Mass ◽

Symmetric Tensor ◽

Momentum Tensor ◽

Unified Field Theory ◽

Field Equations ◽

Metric Tensor ◽

Unified Field

ABSTRACTIt is suggested, on heuristic grounds, that the energy-momentum tensor of a material field with non-zero spin and non-zero rest-mass should be non-symmetric. The usual relationship between energy-momentum tensor and gravitational potential then implies that the latter should also be a non-symmetric tensor. This suggestion has nothing to do with unified field theory; it is concerned with the pure gravitational field.A theory of gravitation based on a non-symmetric potential is developed. Field equations are derived, and a study is made of Rosenfeld identities, Bianchi identities, angular momentum and the equations of motion of test particles. These latter equations represent the geodesics of a Riemannian space whose contravariant metric tensor is gij–, in agreement with a result of Lichnerowicz(9) on the bicharacteristics of the Einstein–Schrödinger field equations.

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FIRST-ORDER APPROXIMATION OF THE NUMBER-PROJECTED SO(2N) TAMM-DANCOFF EQUATION AND ITS REDUCTION BY THE SCHUR FUNCTION

International Journal of Modern Physics E ◽

10.1142/s0218301399000318 ◽

1999 ◽

Vol 08 (05) ◽

pp. 461-483

Author(s):

SEIYA NISHIYAMA

Keyword(s):

Wave Function ◽

Order Approximation ◽

Approximate Equation ◽

Variation Principle ◽

Schur Function ◽

Soliton Theory ◽

First Order ◽

Fermion Systems ◽

Group Manifold ◽

First Order Approximation

First-order approximation of the number-projected (NP) SO(2N) Tamm-Dancoff (TD) equation is developed to describe ground and excited states of superconducting fermion systems. We start from an NP Hartree-Bogoliubov (HB) wave function. The NP SO(2N) TD expansion is generated by quasi-particle pair excitations from the degenerate geminals in the number-projected HB wave function. The Schrödinger equation is cast into the NP SO(2N) TD equation by the variation principle. We approximate it up to first order. This approximate equation is reduced to a simpler form by the Schur function of group characters which has a close connection with the soliton theory on the group manifold.

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Analysis of Linear Nonconservative Vibrations

Journal of Applied Mechanics ◽

10.1115/1.2896001 ◽

1995 ◽

Vol 62 (3) ◽

pp. 685-691 ◽

Cited By ~ 34

Author(s):

F. Ma ◽

T. K. Caughey

Keyword(s):

Modal Analysis ◽

Equations Of Motion ◽

Substantial Reduction ◽

Computational Effort ◽

Equivalence Transformations ◽

State Space Approach ◽

Nonconservative System ◽

First Order ◽

Physical Insight ◽

Space Approach

The coefficients of a linear nonconservative system are arbitrary matrices lacking the usual properties of symmetry and definiteness. Classical modal analysis is extended in this paper so as to apply to systems with nonsymmetric coefficients. The extension utilizes equivalence transformations and does not require conversion of the equations of motion to first-order forms. Compared with the state-space approach, the generalized modal analysis can offer substantial reduction in computational effort and ample physical insight.

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Consistent section-averaged equations of quasi-one-dimensional laminar flow

Journal of Fluid Mechanics ◽

10.1017/s0022112010002594 ◽

2010 ◽

Vol 656 ◽

pp. 337-341 ◽

Cited By ~ 17

Author(s):

PAOLO LUCHINI ◽

FRANÇOIS CHARRU

Keyword(s):

Equations Of Motion ◽

Stability Result ◽

Momentum Equation ◽

Dissipation Function ◽

Dimensional Solution ◽

First Order ◽

Averaged Equations ◽

Classical Stability ◽

Momentum Integral ◽

Free Falling

Section-averaged equations of motion, widely adopted for slowly varying flows in pipes, channels and thin films, are usually derived from the momentum integral on a heuristic basis, although this formulation is affected by known inconsistencies. We show that starting from the energy rather than the momentum equation makes it become consistent to first order in the slowness parameter, giving the same results that have been provided until today only by a much more laborious two-dimensional solution. The kinetic-energy equation correctly provides the pressure gradient because with a suitable normalization the first-order correction to the dissipation function is identically zero. The momentum equation then correctly provides the wall shear stress. As an example, the classical stability result for a free falling liquid film is recovered straightforwardly.

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GEOMETRICAL CONSTRAINTS FOR D = 10, N = 1 SUPERGRAVITY

International Journal of Modern Physics A ◽

10.1142/s0217751x89001540 ◽

1989 ◽

Vol 04 (15) ◽

pp. 3819-3831 ◽

Cited By ~ 4

Author(s):

LING-LIE CHAU ◽

CHONG-SA LIM

Keyword(s):

Equations Of Motion ◽

Bianchi Identities ◽

Dynamical Consequence ◽

Integrability Conditions ◽

Geometrical Constraints ◽

Additional Constraints

A set of geometrical constraints for D = 10, N = 1 supergravity is formulated. It has the meaning as integrability conditions on "hyperplanes" determined by light-like lines in the superspace. The dynamical consequence of these geometrical constraints is studied via Bianchi identities. Since no equations of motion have resulted, these geometrical constraints can form an off-shell set of constraints for the theory. We also discuss additional constraints that lead to Poincare supergravity equations of motion. The relation of the theory with D = 4 N = 4 supergravity is also illuminated.

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