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In some 'esoteric' areas of [[mathematics]], the '''logarithmic integral''' or '''integral logarithm''' li(''x'') is a [[function|non-elementary
:<math> {\rm li} (x) = \int_{0}^{x} {1\over \ln t} dt \; . </math>
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 ''Cauchy's principal value'':
:<math> {\rm li} (x) = \lim_{\varepsilon \to 0} \left( \int_{0}^{1-\varepsilon} {1\over \ln t} dt + \int_{1+\varepsilon}^{x} {1\over \ln t} dt \right) \; . </math>
The growth behavior of this function for ''x'' → ∞ is
:<math> {\rm li} (x) = \Theta \left( {x\over \ln x} \right) \; . </math>
(see [[big O notation]]).
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:π(''x'') ~ Li(''x'')
where π(''x'') denotes a [[multiplicative function]] - the number of primes smaller than or equal to ''x'', and Li(''x'') is the [[offset logarithmic integral]] function, related to li(''x'') by Li(''x'') = li(''x'') - li(2).
The offset logarithmic integral gives a slightly better estimate to the π function than li(''x''). The function li(''x'') is related to the ''[[exponential integral]]'' Ei(''x'') via the equation :li(''x'') = Ei (ln ''x'') for all positive real ''x'' ≠ 1.
This leads to series expansions of li(''x''), for instance:
:<math> {\rm li} (e^{u}) = \gamma + \ln \left| u \right| + \sum_{n=1}^{\infty} {u^{n}\over n \cdot n!} \quad {\rm for} \; u \ne 0 \; , </math>
The function li(''x'') has a single positive zero; it occurs at ''x'' ≈ 1.45136 92348 ...; this number is known as the ''[[Ramanujan]]-Soldner constant''.▼
▲where γ ≈ 0.57721 56649 01532 ... is the [[Euler-Mascheroni gamma constant]]. The function li(''x'') has a single positive zero; it occurs at ''x'' ≈ 1.45136 92348 ...; this number is known as the ''[[Ramanujan]]-Soldner constant''.
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