Well I suppose I could fit it with the Taylor expansion at, say, 0 and 3i, not sure about the asymptotic yet, but that would give good enough plane coverage for the zoom-in. However, I'd probably want to have even more decimals first, at least reproduce the 14 decimal thing, so I'll probably need to go for the Gauss-Legendre process. Or I could use the approximation already given in the paper.
I'm curious: what did you think, when you ran that first graph and saw the fractal contained in it? Did it take you by surprise?
I'm curious: what did you think, when you ran that first graph and saw the fractal contained in it? Did it take you by surprise?