Papers Published
Abstract:
We give an error estimate for the energy and helicity preserving scheme (EHPS) in
second order finite difference setting on axisymmetric incompressible flows with swirling velocity. This
is accomplished by a weighted energy estimate, along with careful and nonstandard local truncation
error analysis near the geometric singularity and a far field decay estimate for the stream function.
A key ingredient in our a priori estimate is the permutation identities associated with the Jacobians,
which are also a unique feature that distinguishes EHPS from standard finite difference schemes.