User blog comment:KthulhuHimself/The Mandelbrot function, and the use of fractals in googology./@comment-1605058-20151018073516/@comment-27014275-20151018083031

1. Suppose I have a line, and that line bends. "Points in which the cuviture peaks" refers to the points where the curve is the most extreme in comparison to the points adjacent to it. For exampe, a parabole has one such point, its head.

2. a mandelbrot set is defined by a certain amout of iterations, usually infinity. If you use a finite number, you get a curve that is not a fracal, and, as stated above, will have several curviture peaks, depending on the number of iterations.

3. Just assumed it is. It seemed to have quite an unusual growth-rate, and the numbers do NOT hold a singlular frame.