1,1

Denominator of Sum[i=1..n] 1/(p(i)^p(i)), where p(i) = i-th prime. Numerators = A117579. E.g. 1/4, 31/108, 96983/337500, 79870008269/277945762500, 22787845491220720044859/79301169838123235887500, ... - Jonathan Vos Post (jvospost2(AT)yahoo.com), Mar 29 2006

Equally, denominator of Sum[ (-1)^(k+1) * 1/p(k)^p(k), {k,1,n}], where p(k) = Prime[k]. - Alexander Adamchuk (alex(AT)kolmogorov.com), Aug 22 2006

C = Sum[ (-1)^(k+1) * 1/Prime[k]^Prime[k], {k,1,Infinity} ] = 1/2^2 - 1/3^3 + 1/5^5 - 1/7^7 + 1/11^11 - 1/13^13 + ... A122147[n] is a decimal expansion of C = 0.213281748700785698255627... - Alexander Adamchuk (alex(AT)kolmogorov.com), Aug 22 2006

A122148[n] / A076265[n] begins 1/4, 23/108, 71983/337500, ... - Alexander Adamchuk (alex(AT)kolmogorov.com), Aug 22 2006

Table[Denominator[Sum[1/Prime[k]^Prime[k], {k, 1, n}]], {n, 1, 10}] - Alexander Adamchuk (alex(AT)kolmogorov.com), Aug 22 2006

Cf. A051674, A122147, A122148, A094289, A117579, A076265, A000040.

Adjacent sequences: A076262 A076263 A076264 this_sequence A076266 A076267 A076268

Sequence in context: A061464 A107048 A002109 this_sequence A114876 A037980 A015100

nonn,frac

Jeff Burch (gburch(AT)erols.com), Nov 23 2002

Entry revised by njas, Apr 10 2006

Edited by njas, Aug 04 2008 at the suggestion of R. J. Mathar