In message <[email protected]>, wrote: > Lawrence D'Oliveiro <[email protected]_zealand> writes: > >> I don't think any countable set, even a countably-infinite set, can have >> a fractal dimension. It's got to be uncountably infinite, and therefore >> uncomputable. > > I think the idea is you assume uniform continuity of the set (as > expressed by a parametrized curve). That should let you approximate > the fractal dimension.
Fractals are, by definition, not uniform in that sense. -- http://mail.python.org/mailman/listinfo/python-list
