Search: id:A159313 Results 1-1 of 1 results found. %I A159313 %S A159313 1,1,7,55,601,7136,116929,1985607,42814321,954103114,25933795801, %T A159313 717297529686,23297606120881,770246625909788,29137514248718373, %U A159313 1127405063005559911,48661170952876980481,2139268956511467712586 %N A159313 G.f.: 1/Product_{n>=1} (1 - a(n)*x^n/n!) = Sum_{n>=0} (n+1)^(n-1)*x^n/ n! . %F A159313 a(n) = n^(n-1) - (n-1)!*[ Sum_{d divides n, d1 with a(1)=1. %F A159313 G.f.: Sum_{n>=1} -log(1 - a(n)*x^n/n!) = Sum_{n>=1} n^(n-1)*x^n/n! = -LambertW(-x). %F A159313 G.f.: Sum_{n>=1} -log(1 - a(n)*exp(-n*x)*x^n/n!) = x. %F A159313 G.f.: Sum_{n>=1} n*a(n)*x^n/[n! - a(n)*x^n] = Sum_{n>=1} n^n*x^n/n!. %F A159313 G.f.: Sum_{n>=1} n*a(n)*x^n/[n!*exp(nx) - a(n)*x^n] = x/(1-x). %e A159313 G.f.: W(x) = 1/[(1-x)*(1-x^2/2!)*(1-7*x^3/3!)*(1-55*x^4/4!)*(1-601*x^5/ 5!)*...] %e A159313 where W(x) = 1 + x + 3*x^2/2! + 4^2*x^3/3! + 5^3*x^4/4! + 6^4*x^5/5! +... %e A159313 and W(x/exp(x)) = exp(x) and exp(x*W(x)) = W(x) = LambertW(-x)/(-x). %o A159313 (PARI) {a(n)=if(n<1, 0, if(n==1, 1,n^(n-1) - (n-1)!*sumdiv(n, d, if(d