Thanks so much, Gottfried! This works perfectly; albeit, it's a little slow.
I'm going to try and make some graphs now.
Regards, James
I don't think this is the same program Sheldon uses, but god damned is this better.
Here's my solution to the Abel equation with \( \log(2) \) multiplier over \( -1 \le \Re(z) \le 4 \) and \( 0.5 \le \Im(z) \le 2.5 \):
EDIT: This is about 8 digit precision; it may dip to 4 occasionally, but it hovers around 12; so let's just say 8.
I'm going to try and make some graphs now.
Regards, James
I don't think this is the same program Sheldon uses, but god damned is this better.
Here's my solution to the Abel equation with \( \log(2) \) multiplier over \( -1 \le \Re(z) \le 4 \) and \( 0.5 \le \Im(z) \le 2.5 \):
EDIT: This is about 8 digit precision; it may dip to 4 occasionally, but it hovers around 12; so let's just say 8.