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Albert Chan · 01-12-2021, 07:49 PM

(01-12-2021 05:28 PM)C.Ret Wrote:
(01-11-2021 06:13 PM)Albert Chan Wrote: I just learned how to proof this, using Spence's function (dilogarithm)

$[Image: 2702db245344b9d368f7cffd4e21b625c72e633a]$

Break-up Integral to parts, and integrate each:

Wait a minute !

I just realize that I don't know how to integrate such an integral ; $[Image: gif.latex?z%20%5Cin%5Cmathbb%7BC%7D]$ .

Just move complex z inside the function. Let $u = z\; x\;,\;du = z\;dx$

$\displaystyle Li_2(z) = - \int _0^1 {\ln(1-z\;x) \over x} dx$

This substitution of variable give neat result. Example, let $u = x^k\;,\;du = k\;x^{k-1}\;dx$

$\displaystyle -k \int _0^1 {\ln(1-x^k) \over x} dx
= -k \int _0^1 {\ln(1-u) \over x} {du \over k\;x^{k-1}}
= - \int _0^1 {\ln(1-u) \over u} du
= Li_2(1) = {\pi^2 \over 6} $

I thought above formula had something to do with Valentin's puzzle ... but no luck.