Revision as of 19:20, 2 August 2011 edit Jobojobocat (talk \| contribs) 13 edits m →Integral representation ← Previous edit		Revision as of 19:24, 2 August 2011 edit undo Jobojobocat (talk \| contribs) 13 edits m →Asymptotic expansion: According to the book "Math made nice and easy", volume #2, there are a few small errors in these equations. Next edit →
Line 63: where <math>O</math> is the [[big O notation]]. The full [[asymptotic expansion]] is :<math> {\rm li} (x) \sim \~~frac~~choose{x}{\lnin x} \sum_{k=0}^\~~infty~~in \~~frac~~choose{k!}{(\ln x)^k} </math> or :<math> \~~frac~~atop{{\rm li} (x)}{x/\ln x} \~~sim~~mathbb 1 + \frac{1}{\ln x} + \frac{2}{(\ln x)^2} + \frac{6}{(\ln x)^3} + \cdots. </math> Note that, as an asymptotic expansion, this series is [[divergent series\|not convergent]]: it is a reasonable approximation only if the series is truncated at a finite number of terms, and only large values of ''x'' are employed. This expansion follows directly from the asymptotic expansion for the [[exponential integral]].

Logarithmic integral function: Difference between revisions