Bondi Accretion in Trumpet Geometries

The Bondi solution, which describes the radial inflow of a gas onto a non-rotating black hole, provides a powerful test for numerical relativistic codes. However, this solution is typically derived in Schwarzschild coordinates, which are not well suited for dynamical spacetime evolutions. Instead, many current numerical relativistic codes adopt moving-puncture coordinates, which render black holes in trumpet geometries. Here we transform the Bondi solution into two different trumpet coordinate systems, both of which result in regular expressions for the fluid flow extending into the black hole interior. We also evolve these solutions numerically and demonstrate their usefulness for testing and calibrating numerical codes.

About this item

Creator: August J Miller

Date: 2016-01-01

Contributor: Thomas Baumgarte, Advisor

Bowdoin Department or Program: Physics and Astronomy

Subject: Cosmology, Relativity, and Gravity; numerical relativity; Bondi accretion; black holes; trumpet coordinates

Access: Open access

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