Stability of Toomre-Hayashi Disk
Abstract
We investigate stability of Toomre-Hayashi model for a self-gravitating, rotating gas disk. The rotation velocity, vϕ, and sound speed, c s , are spatially constant in the model. We show that the model is unstable against an axisymmetric perturbation irrespectively of the values of vϕ and c s . When the ratio, vϕ/ c s , is large, the model disk is geometrically thin and unstable against an axisymmetric perturbation having a short radial wavelength, i.e., unstable against fragmentation. When vϕ/ c s is smaller than 1.20, it is unstable against total collapse. Toomre-Hayashi model of 1.7 vϕ/ c s 3 was thought to be stable against axisymmetric perturbations in earlier studies in which only radial motion was taken into account. Thus, the instability of Toomre-Hayashi model having a medium vϕ/ c s is due to not change in the surface density but that in the disk height. We also find that the singular isothermal perturbation is stable against non-spherical peturbations.
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