Billiard representation for multidimensional cosmology with multicomponent perfect fluid near the singularity

Ivashchuk, V. D.; Melnikov, V. N.

doi:10.1088/0264-9381/12/3/017

Cited by 63 publications

(104 citation statements)

References 37 publications

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“…Multidimensional generalizations of this model were considered by many authors (see, for example, [29,76,77,78]). In [79,80,81] the billiard representation for multidimensional cosmological models near the singularity was considered and the criterion for the volume of the billiard to be finite was established in terms of illumination of the unit sphere by point-like sources. For perfect-fluid this was considered in detail in [81].…”

Section: Multidimensional Modelsmentioning

confidence: 99%

“…In [79,80,81] the billiard representation for multidimensional cosmological models near the singularity was considered and the criterion for the volume of the billiard to be finite was established in terms of illumination of the unit sphere by point-like sources. For perfect-fluid this was considered in detail in [81]. Some interesting topics related to general (non-homogeneous) situation were considered in [82].…”

Section: Multidimensional Modelsmentioning

confidence: 99%

“…In [81] the "quantum billiard" was obtained for multidimensional WDW solutions near the singularity. It should be also noted that the "third-quantized" multidimensional cosmological models were considered in several papers [59,103,97].…”

Section: Multidimensional Modelsmentioning

confidence: 99%

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Multidimensional Cosmological and Spherically Symmetric Solutions with Intersecting p-Branes

Ivashchuk

Melnikov

2000

Mathematical and Quantum Aspects of Relativity and Cosmology

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Abstract. Multidimensional model describing the "cosmological" and/ or spherically symmetric configuration with (n + 1) Einstein spaces in the theory with several scalar fields and forms is considered. When electro-magnetic composite p-brane ansatz is adopted, n "internal" spaces are Ricci-flat, one space M 0 has a non-zero curvature, and all p-branes do not "live" in M 0 , a class of exact solutions is obtained if certain block-orthogonality relations on p-brane vectors are imposed. A subclass of spherically-symmetric solutions containing non-extremal p-brane black holes is considered. Post-Newtonian parameters are calculated and some examples are considered.

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Section: Multidimensional Modelsmentioning

confidence: 99%

Section: Multidimensional Modelsmentioning

confidence: 99%

See 1 more Smart Citation

Multidimensional Cosmological and Spherically Symmetric Solutions with Intersecting p-Branes

Ivashchuk

Melnikov

2000

Mathematical and Quantum Aspects of Relativity and Cosmology

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“…This metric coincides with the power-law, inflationary solution in the model with a one-component perfect fluid when the following equation of state is adopted: p = 2 5 ρ , where p is pressure and ρ is the density of fluid [119,120]. …”

Section: Remarkmentioning

confidence: 64%

“…For D = 11 supergravity and ten-dimensional I I A , I IB supergravities, all (U s , U s ) = 2 [44,55] and corresponding KM algebras are simply laced. It was shown in our papers [29][30][31] that the inequality (U s , U s ) > 0 is a necessary condition for the formation of the billiard wall (ifone approaches the singularity) by the s-th matter source (e.g., a fluid component or a brane).…”

Section: Introductionmentioning

confidence: 99%

On Brane Solutions with Intersection Rules Related to Lie Algebras

Ivashchuk

2017

Symmetry

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Abstract:The review is devoted to exact solutions with hidden symmetries arising in a multidimensional gravitational model containing scalar fields and antisymmetric forms. These solutions are defined on a manifold of the form M = M 0 × M 1 × . . . × M n , where all M i with i ≥ 1 are fixed Einstein (e.g., Ricci-flat) spaces. We consider a warped product metric on M . Here, M 0 is a base manifold, and all scale factors (of the warped product), scalar fields and potentials for monomial forms are functions on M 0 . The monomial forms (of the electric or magnetic type) appear in the so-called composite brane ansatz for fields of forms. Under certain restrictions on branes, the sigma-model approach for the solutions to field equations was derived in earlier publications with V.N.Melnikov. The sigma model is defined on the manifold M 0 of dimension d 0 = 2 . By using the sigma-model approach, several classes of exact solutions, e.g., solutions with harmonic functions, S-brane, black brane and fluxbrane solutions, are obtained. For d 0 = 1 , the solutions are governed by moduli functions that obey Toda-like equations. For certain brane intersections related to Lie algebras of finite rank-non-singular Kac-Moody (KM) algebras-the moduli functions are governed by Toda equations corresponding to these algebras. For finite-dimensional semi-simple Lie algebras, the Toda equations are integrable, and for black brane and fluxbrane configurations, they give rise to polynomial moduli functions. Some examples of solutions, e.g., corresponding to finite dimensional semi-simple Lie algebras, hyperbolic KM algebras: H 2 (q, q) , AE 3 , H A (1) 2 , E 10 and Lorentzian KM algebra P 10 , are presented.

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Multidimensional Gravity and Cosmology and Problems of G

Grebeniuk¹,

Melnikov

2002

Gravitation and Cosmology: From the Hubble Radius to the Planck Scale

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Billiard representation for multidimensional cosmology with multicomponent perfect fluid near the singularity

Cited by 63 publications

References 37 publications

Multidimensional Cosmological and Spherically Symmetric Solutions with Intersecting p-Branes

Multidimensional Cosmological and Spherically Symmetric Solutions with Intersecting p-Branes

On Brane Solutions with Intersection Rules Related to Lie Algebras

Multidimensional Gravity and Cosmology and Problems of G

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