In many publications dealing with asymptotic determinations of the n-th prime number, the following paper is cited:
[1]: M. Cipolla, La determinazione asintotica dell’n-esimo numero primo. rendiconti dell'accademia delle scienze fisico-matematiche di Napoli vol 3 ser 8, 132-166.
My problem is that I can't find this paper.
I know that in [1] the following expansion is shown:
$\log(\log(n))=\log_2(n)$ $$\frac{p_n}{n}= \log(n)+\log_2(n)-1+\sum_{i=1}^m(-)^{i+1}\frac{P_i(\log_2(n))}{i! \log(n)^i}+o\Big(\frac{1}{\log(n)^m}\Big) $$
in publications such as [2], [3] it is written that Cipolla in [1] proved that $ P_i (\log_2 (n)) $ are polynomials with integer coefficients and gave a recurring formula for $ P_i $
in [2] section 5. this recurring formula is shown:
$X=\log_2(n)$
$$ a) \ \ P_1(X)=X-2, \ \ P_2(X)=X^{2}-6X+11 $$ $$ b) \ \ P'_k=k(k-1)P_{k-1}+kP'_{k-1}, \ \ k\geq2$$ $$ c) \ \ P_{k+1}(0)=-k\Biggl(\sum_{j=1}^{k-1}\binom{n+1}{2k}P_j(0)\Big(P_{k-j}(0)+P'_{k-j}(0)\Big) +P_{k}(0)+P'_{k}(0)\Biggl)-(k+1)P_{k}(0)-P'_{k+1}(0)$$
and 7 polynomials are computed,some examples:
$P_3(X)=2X^3 -21X^2+84X-131$
$P_4(X)=6X^4-92X^3+588X^2-1908X+2666$
$P_5(X)=24X^5-490X^4+4380X^3-22020X^2+62860X-81534$
but $ (b), (c) $ are wrong and do not give the polynomials that are shown instead.
the error in $ (b) $ is easy to find, the correct $ b $:
$$ P'_k=k(k-1)P_{k-1}-kP'_{k-1}, \ \ k\geq2$$ but I can not fix $ (c) $ which seems to be correct only up to $ P_3 (0) = - 131 $
Can someone show me a correct version of $ c $?
Thanks for your attention
[2] https://www.emis.de/journals/JIPAM/images/153_02_JIPAM/153_02.pdf
