Numerical tests of evolution systems, gauge conditions, and boundary conditions for 1D colliding gravitational plane waves

Bardeen, John; Buchman, Luisa T.

doi:10.1103/physrevd.65.064037

Cited by 56 publications

(81 citation statements)

References 33 publications

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“…With the lowest one corresponding to m π as low as 180 MeV, it is found that, when the quark mass is smaller than that of the strange, a 0 mass levels off, in contrast to those of a 1 and other hadrons that have been calculated on the lattice. This confirms the trend that has been observed in earlier works at higher quark masses in both the quenched and unquenched calculations [7,8,9,10]. The chiral extrapolated mass a 0 = 1.42 ± 0.13 GeV suggests that a 0 (1450) is a qq state.…”

Section: Introductionsupporting

confidence: 79%

“…However, there are several serious problems with this scenario. First, the isovector scalar meson a 0 (1450) is confirmed to be a qq meson in lattice calculations [6,7,8,9, 10] which will be discussed later. As such, the degeneracy of a 0 (1450) and K * 0 (1430), which has a strange quark, cannot be explained if M S is larger than M N by ∼ 250 MeV.…”

Section: Introductionmentioning

confidence: 99%

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Scalar glueball, scalar quarkonia, and their mixing

2006

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The isosinglet scalar mesons f 0 (1710), f 0 (1500), f 0 (1370) and their mixing are studied. We employ two recent lattice results as the starting point; one is the isovector scalar meson a 0 (1450) which displays an unusual property of being nearly independent of quark mass for quark masses smaller than that of the strange, and the other is the scalar glueball mass at 1710 MeV in the quenched approximation. In the SU(3) symmetry limit, f 0 (1500) turns out to be a pure SU(3) octet and is degenerate with a 0 (1450), while f 0 (1370) is mainly an SU(3) singlet with a slight mixing with the scalar glueball which is the primary component of f 0 (1710). These features remain essentially unchanged even when SU(3) breaking is taken into account. We discuss the sources of SU(3) breaking and their consequences on flavor-dependent decays of these mesons. The observed enhancement of ωf 0 (1710) production over φf 0 (1710) in hadronic J/ψ decays and the copious f 0 (1710) production in radiative J/ψ decays lend further support to the prominent glueball nature of f 0 (1710).

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Section: Introductionsupporting

confidence: 79%

Section: Introductionmentioning

confidence: 99%

Scalar glueball, scalar quarkonia, and their mixing

2006

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“…These quantities are evaluated atQ, whereQ is the same quantity as computed in step (3). (11) De-orthonormalize at the cell edge:…”

Section: The Algorithmmentioning

confidence: 99%

“…If the solution domain is a flat manifold but contains complicated internal or external boundaries, it is often possible to introduce a curvilinear grid that conforms to the boundaries [41]. A fundementally different situation arises when the solution domain is a curved manifold, such as the surface of a sphere of radius r embedded in lR 3 . In this situation, the curvature of the manifold modifies the underlying dynamics.…”

Section: Introductionmentioning

confidence: 99%

“…The method is numerically conservative, second order accurate in smooth regions, non-dispersive in regions of large gradients, and shockcapturing. This method has been successfully applied in the past to several applications areas, including gas dynamics [21], acoustics [9,10], elasticity and plasticity [8,22,26,27], combustion and detonation waves [16,17], relativistic hydrodynamics [1], and numerical relativity [3,18].…”

Section: Introductionmentioning

confidence: 99%

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A wave propagation algorithm for hyperbolic systems on curved manifolds

Rossmanith

Bale

LeVeque

2004

Journal of Computational Physics

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An extension of the wave propagation algorithm first introduced by LeVeque [J. Comp. Phys. 131, 327-353 (1997)] is developed for hyperbolic systems on a general curved manifold. This extension is important in a variety of applications, including the propagation of sound waves on a curved surface, shallow water flow on the surface of the Earth, shallow water magnetohydrodynamics in the solar tachocline, and relativistic hydrodynamics in the presence of compact objects such as neutron stars and black holes. As is the case for the Cartesian wave propagation algorithm, this new approach is second order accurate for smooth flows and high-resolution shockcapturing. The algorithm is formulated such that scalar variables are numerically conserved and vector variables have a geometric source term that is naturally incorporated into a modified Riemann solver. Furthermore, all necessary one-dimensional Riemann problems are solved in a locally valid orthonormal basis. This orthonormalization allows one to solve Cartesian Riemann problems that are devoid of geometric terms. The new method is tested via application to the linear wave equation on a curved manifold as well as the shallow water equations on part of a sphere. The proposed algorithm has been implemented in the software package clawpack and is freely available on the web.

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Initial and Initial‐Boundary Value Problems for First‐Order Symmetric Hyperbolic Systems with Constraints

Tarfulea

2015

Mathematical and Computational Modeling

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Numerical tests of evolution systems, gauge conditions, and boundary conditions for 1D colliding gravitational plane waves

Cited by 56 publications

References 33 publications

Scalar glueball, scalar quarkonia, and their mixing

Scalar glueball, scalar quarkonia, and their mixing

A wave propagation algorithm for hyperbolic systems on curved manifolds

Initial and Initial‐Boundary Value Problems for First‐Order Symmetric Hyperbolic Systems with Constraints

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