Offset logarithmic integral

The offset logarithmic integral, or European logarithmic integral, is a non-elementary function Li(x) differing by a constant from the logarithmic integral function li(x), defined such that:

<math> {\rm Li} (x) = \mathrm{li}(x) - \mathrm{li}(2).\,<math>

Explicitly, this means

<math> {\rm Li} (x) = \int_{2}^{x} \frac{dt}{\ln t} \, <math>

where ln is the natural logarithm. It can be shown that

<math> {\rm Li} (x) = \frac{x}{\ln x} \sum_{k=0}^{\infty} \frac{k!}{(\ln x)^k} <math>

or

<math> \frac{{\rm Li} (x)}{x/\ln x} = 1 + \frac{1}{\ln x} + \frac{2}{(\ln x)^2} + \cdots. <math>

It is often used in formulations of the prime number theorem.

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