08/16/2007, 09:29 PM
You mean if you have an attracting fixed point then you simply get an arbitrary small x by applying \( f^{\circ n} \) so that the precision becomes arbitrary big for the subsequent \( f^{\circ t} \) and then you transform it back to the original value by applying \( f^{\circ -n} \)?
Hm, I dont know whether you loose the achieved precision by transforming it back. This also would only work for fractional iterations, while I was talking about general series.
Hm, I dont know whether you loose the achieved precision by transforming it back. This also would only work for fractional iterations, while I was talking about general series.