Hydrodynamical evolution of coalescing binary neutron stars

Frederic A. Rasio*, Stuart L. Shapiro

*Corresponding author for this work

Research output: Contribution to journalArticle

110 Scopus citations

Abstract

We report the results of three-dimensional Newtonian calculations of neutron-star binary coalescence using smooth particle hydrodynamics (SPH). Using a relaxation technique, we construct hydrostatic equilibrium models of close neutron-star binaries in synchronized circular orbits. We use a simple polytropic equation of state with Γ = 2 to represent cold nuclear matter, and we assume that the mass ratio q = 1, as observed in all known neutron-star binary systems. Using SPH, we study the dynamical stability of these hydrostatic equilibrium models. In a sequence of models with decreasing binary separation we find that dynamical instability sets in slightly before the point along the sequence where the surfaces of the two stars come into contact. This is in agreement with the known stability properties of the solutions of the classical Darwin problem for two identical, incompressible components. We find that the initial stage of the instability, consisting in the steady merging of the two stars into a single ellipsoidal object, is completed in about one orbital period. At his point sudden mass shedding is triggered, resulting in the rapid removal of matter from the central object through two outgoing spiral arms. This results in the rapid redistribution of matter in the system until a new, nearly axisymmetric, differentially rotating equilibrium structure has formed. Using the quadrupole approximation, we follow the emission of gravitational radiation from the onset of dynamical instability to the establishment of axial symmetry. To support our results, we present several test-bed calculations which use SPH for binary systems. We consider axisymmetric, head-on collisions between two identical Γ = 2 polytropes and compare our SPH results to those of previous finite-difference calculations. Most importantly we calcultae solutions of the Roche and Darwin problems for polytropes with a wide range of adiabatic indices, 5/3 ≤ Γ ≤ 10. We find good agree ment with known analytical results, in both the nearly incompressible and highly compressible limiting regimes. These calculations provide stringent tests of our method's ability to hold stable binaries in equilibrium and to identify terminal points or the onset of dynamical instability along equilibrium sequences of close binaries. Such tests are crucial for establishing the credibility of numerical results and, in particular, of computed gravitational radiation waveforms.

Original languageEnglish (US)
Pages (from-to)226-245
Number of pages20
JournalAstrophysical Journal
Volume401
Issue number1
DOIs
StatePublished - Dec 10 1992

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Keywords

  • Binaries: close
  • Hydrodynamics
  • Radiation mechanisms: gravitational
  • Stars: neutron

ASJC Scopus subject areas

  • Astronomy and Astrophysics
  • Space and Planetary Science

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