Paper detail

Axisymmetric Numerical Relativity

This thesis is concerned with formulations of the Einstein equations in axisymmetric spacetimes which are suitable for numerical evolutions. We develop two evolution systems based on the (2+1)+1 formalism. The first is a (partially) constrained scheme with elliptic gauge conditions arising from maximal slicing and conformal flatness. The second is a strongly hyperbolic first-order formulation obtained by combining the (2+1)+1 formalism with the Z4 formalism. A careful study of the behaviour of regular axisymmetric tensor fields enables us to cast the equations in a form that is well-behaved on the axis. Further topics include (non)uniqueness of solutions to the elliptic equations arising in constrained schemes, and comparisons between various boundary conditions used in numerical relativity. The numerical implementation is applied to adaptive evolutions of nonlinear Brill waves, including twist.