I am trying to determine what the behavior of the inverse logarithmic integral is as $z\to \infty$. I noticed that $f'(z)=\ln(f(z))$ which follows from differentiating $$z=\int_2^{f(z)} \frac{dx}{\ln(x)}$$ but I do not know if that could help in this situation. If anyone has any ideas or methods on how to find the asymptotics of this function it would be greatly appreciated.
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Since $\int_2^{z} \frac{dx}{\ln(x)} $ is essentially the logarithmic integral (see https://en.wikipedia.org/wiki/Logarithmic_integral_function), what you are looking for is the inverse of this.
A search for "inverse of logarithmic integral" comes up with a number of good hits including this, here: Inverse logarithmic integral
marty cohen
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