%I #35 Oct 29 2023 08:36:44
%S 1,4194305,31381059610,17592190238721,2384185791015626,
%T 131621735227521050,3909821048582988050,73786993887028445185,
%U 984770902214992292491,10000002384185795209930,81402749386839761113322,552061570551763831158810,3211838877954855105157370
%N a(n) = sigma_22(n), the sum of the 22nd powers of the divisors of n.
%C If the canonical factorization of n into prime powers is the product of p^e(p) then sigma_k(n) = Product_p ((p^((e(p)+1)*k))-1)/(p^k-1).
%C Sum_{d|n} 1/d^k is equal to sigma_k(n)/n^k. So sequences A017665-A017712 also give the numerators and denominators of sigma_k(n)/n^k for k = 1..24. The power sums sigma_k(n) are in sequences A000203 (k=1), A001157-A001160 (k=2,3,4,5), A013954-A013972 for k = 6,7,...,24. - Ahmed Fares (ahmedfares(AT)my-deja.com), Apr 05 2001
%H Seiichi Manyama, <a href="/A013970/b013970.txt">Table of n, a(n) for n = 1..10000</a>
%H <a href="/index/Si#SIGMAN">Index entries for sequences related to sigma(n)</a>.
%F G.f.: Sum_{k>=1} k^22*x^k/(1-x^k). - _Benoit Cloitre_, Apr 21 2003
%F From _Amiram Eldar_, Oct 29 2023: (Start)
%F Multiplicative with a(p^e) = (p^(22*e+22)-1)/(p^22-1).
%F Dirichlet g.f.: zeta(s)*zeta(s-22).
%F Sum_{k=1..n} a(k) = zeta(23) * n^23 / 23 + O(n^24). (End)
%t lst={};Do[AppendTo[lst,DivisorSigma[22,n]],{n,5!}];lst (* _Vladimir Joseph Stephan Orlovsky_, Mar 11 2009 *)
%t a[ n_] := DivisorSigma[ 22, n]; (* _Michael Somos_, Dec 19 2016 *)
%o (Sage) [sigma(n,22)for n in range(1,12)] # _Zerinvary Lajos_, Jun 04 2009
%o (PARI) vector(50, n, sigma(n,22)) \\ _G. C. Greubel_, Nov 03 2018
%o (Magma) [DivisorSigma(22,n): n in [1..50]]; // _G. C. Greubel_, Nov 03 2018
%Y Cf. A000203, A001157-A001160, A013954-A013972, A017665-A017712.
%K nonn,easy,mult
%O 1,2
%A _N. J. A. Sloane_