Content deleted Content added
mNo edit summary |
No edit summary |
||
Line 5:
The logarithmic integral has an integral representation defined for all positive [[real number]]s <math>x\ne 1</math> by the [[integral|definite integral]]:
:<math> {\rm li} (x) = \
Here, ln denotes the [[natural logarithm]]. The function 1/ln (''t'') has a [[mathematical singularity|singularity]] at ''t'' = 1, and the integral for ''x'' > 1 has to be interpreted as a ''[[Cauchy principal value]]'':
:<math> {\rm li} (x) = \lim_{\varepsilon \to 0} \left( \
==Offset logarithmic integral==
Line 18:
or
:<math> {\rm Li} (x) = \
As such, the integral representation has the advantage of avoiding the singularity in the ___domain of integration.
Line 27:
:<math>\hbox{li}(x)=\hbox{Ei}(\ln(x)) , \,\!</math>
which is valid for
:<math> {\rm li} (e^
\gamma + \ln u + \sum_{n=1}^
\quad \text{
where γ ≈ 0.57721 56649 01532 ... is the [[
:<math>
Line 39:
\gamma
+ \ln \ln x
+ \sqrt{x} \sum_{n=1}^
\frac{ (-1)^{n-1} (\ln x)^n} {n! \, 2^{n-1}}
\sum_{k=0}^{\lfloor (n-1)/2 \rfloor} \frac{1}{2k+1} .
</math>
<!-- cribbed from Mathworld, which cites
Berndt, B. C. Ramanujan's Notebooks, Part IV. New York: Springer-Verlag, pp.
-->
==Special values==
The function li(''x'') has a single positive zero; it occurs at ''x'' ≈ 1.45136 92348 ...; this number is known as the [[
li(2) ≈ 1.045163 780117 492784 844588 889194 613136 522615 578151…
Line 55:
==Asymptotic expansion==
The asymptotic behavior for ''x''
:<math> {\rm li} (x) = \mathcal{O} \left( {x\over \ln x} \right) \; . </math>
where <math>\mathcal{O}</math>
:<math> {\rm li} (x) \sim \frac{x}{\ln x} \sum_{k=0}^
or
| |||