Global Magnetohydrodynamical Simulations of Accretion Tori

John F. Hawley

Virginia Institute of Theoretical Astronomy,

Department of Astronomy, University of Virginia,

Charlottesville, VA 22903; jh8h@virginia.edu

Abstract: Global time-dependent simulations provide a means to investigate time-dependent dynamic evolution in accretion disks. This paper seeks to extend previous local simulations by beginning a systematic effort to develop fully global three-dimensional simulations. The nonlinear development of the magnetorotational instability is investigated using a time-explicit finite difference code written in cylindrical coordinates. The equations of ideal magnetohydrodynamics are solved with the assumption of an adiabatic equation of state. Both a Newtonian, and a pseudo-Newtonian potential are used. Two simplifications are also explored: a cylindrical gravitational potential (the ``cylindrical disk''), and axisymmetry. The results from those simulations are compared with fully three dimensional global simulations.

The global simulations begin with equilibrium pressure supported accretion tori. Two different initial field geometries are investigated: poloidal fields that are constant along initial equidensity surfaces, and toroidal fields with a constant ratio of gas to magnetic pressure. In both cases the magnetorotational instability rapidly develops, and the torus becomes turbulent. The resulting turbulence transports angular momentum, and the torus develops an angular momentum distribution that is near Keplerian. A comparison with axisymmetric simulations shows that in three dimensions the magnetorotational instability can act as a dynamo and regenerate poloidal field thereby sustaining the turbulence. As previously observed in local simulations, the stress is dominated by the Maxwell component. The total stress in the interior of the disk is ~ 0.1-0.2 the thermal pressure. At late time the disks are characterized by relatively thick configurations, with rapid time-dependence, and tightly-wrapped, low-m spiral structures.

1. Introduction

2. Method

3. Results

4. Discussion

Bonus MPEG movies of simulation GT4:

Movies prepared by grad student Wayne Winters.