%I A008405
%S A008405 1,1,2,3,4,90,786,5670,34784,136584,824760,33137280,633666648,
%T A008405 10089623544,145675230960,1910939579640,21215723677440,136130901474240,
%U A008405 2280768466608576,135531682778927808,4380044490023909760
%V A008405 1,1,-2,3,4,-90,786,-5670,34784,-136584,-824760,33137280,-633666648,
%W A008405 10089623544,-145675230960,1910939579640,-21215723677440,136130901474240,
%X A008405 2280768466608576,-135531682778927808,4380044490023909760
%N A008405 n-th derivative of x^(1/x) at x=1.
%F A008405 a(n) = Sum_{k=0..n} Stirling1(n, k)*A003725(k). - Vladeta Jovovic (vladeta(AT)eunet.rs), 
               Oct 02 2003
%t A008405 Function[ n, Series[ (1+x)^(1/(1+x)), {x, 0, n} ]//(Table[ SeriesCoefficient[ 
               #, i ]*i!, {i, 0, n} ])& ][ 20 ]
%Y A008405 Sequence in context: A142959 A037395 A009496 this_sequence A037431 A085935 
               A100981
%Y A008405 Adjacent sequences: A008402 A008403 A008404 this_sequence A008406 A008407 
               A008408
%K A008405 sign
%O A008405 0,3
%A A008405 Olivier Gerard (olivier.gerard(AT)gmail.com)