Shock-Wave Solutions of the Einstein Equations with Perfect Fluid Sources

Shock-Wave Solutions of the Einstein Equations with Perfect Fluid Sources

Existence and Consistency by a Locally Inertial Glimm Scheme
Buch | Softcover
2004
American Mathematical Society (Verlag)
978-0-8218-3553-1 (ISBN)
69,80 inkl. MwSt
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Demonstrates the consistency of the Einstein equations at the level of shock-waves by proving the existence of shock wave solutions of the spherically symmetric Einstein equations for a perfect fluid, starting from initial density and velocity profiles that are only locally of bounded total variation.
We demonstrate the consistency of the Einstein equations at the level of shock-waves by proving the existence of shock wave solutions of the spherically symmetric Einstein equations for a perfect fluid, starting from initial density and velocity profiles that are only locally of bounded total variation. For these solutions, the components of the gravitational metric tensor are only. Lipschitz continuous at shock waves, and so it follows that these solutions satisfy the Einstein equations, as well as the relativistic compressible Euler equations, only in the weak sense of the theory of distributions. The analysis introduces a locally inertial Glimm scheme that exploits the locally flat character of spacetime, and relies on special properties of the relativistic compressible Euler equations when $p=/sigma^2/rho$, $/sigma/equiv const$.

Introduction Preliminaries The fractional step scheme The Riemann problem step The ODE step Estimates for the ODE step Analysis of the approximate solutions The elimination of assumptions Convergence.

Erscheint lt. Verlag 1.1.2005
Reihe/Serie Memoirs of the American Mathematical Society
Zusatzinfo illustrations
Verlagsort Providence
Sprache englisch
Themenwelt Mathematik / Informatik Mathematik Analysis
Naturwissenschaften Physik / Astronomie Relativitätstheorie
ISBN-10 0-8218-3553-X / 082183553X
ISBN-13 978-0-8218-3553-1 / 9780821835531
Zustand Neuware
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