1,4

Eric Weisstein's World of Mathematics, Link to a section of The World of Mathematics.

a(n) = 1/(denominator(permanent(hilbert(n)))*det(hilbert(n))), where hilbert(n) denotes the n-th Hilbert matrix.

with(linalg): seq(1/(denom(permanent(hilbert(n)))*det(hilbert(n))), n=1..16);

Permanent[m_List] := With[{v = Array[x, Length[m]]}, Coefficient[Times @@ (m.v), Times @@ v]]; f[n_] := Block[{i = Table[1/(i + j - 1), {i, n}, {j, n}]}, 1/(Det[i]Denominator[Permanent[i]])]; Table[ f[n], {n, 1, 18}] (from Robert G. Wilson v Feb 06 2004)

(PARI) permRWN(a)=n=matsize(a)[1]; if(n==1, return(a[1, 1])); n1=n-1; sg=1; m=1; nc=0; in=vector(n); x=in; for(i=1, n, x[i]=a[i, n]-sum(j=1, n, a[i, j])/2); p=prod(i=1, n, x[i]); while(m, sg=-sg; j=1; if((nc%2)!=0, j++; while(in[j-1]==0, j++)); in[j]=1-in[j]; nc+=2*in[j]-1; m=nc!=in[n1]; z=2*in[j]-1; for(i=1, n, x[i]+=z*a[i, j]); p+=sg*prod(i=1, n, x[i])); return(2*(2*(n%2)-1)*p) for(n=1, 23, a=mathilbert(n); print1(1/(matdet(a)*denominator(permRWN(a)))", ")) - Herman Jamke (hermanjamke(AT)fastmail.fm), May 10 2007

Cf. A005249.

Sequence in context: A163199 A051561 A163197 this_sequence A076008 A099753 A046359

Adjacent sequences: A061911 A061912 A061913 this_sequence A061915 A061916 A061917

nonn,more

Asher Auel (asher.auel(AT)reed.edu), May 20 2001

a(18)-a(20) from Robert G. Wilson v (rgwv(AT)rgwv.com), Feb 09 2004

a(21) from Eric Weisstein (eric(AT)weisstein.com), Feb 19, 2004

a(22) and a(23) from Herman Jamke (hermanjamke(AT)fastmail.fm), May 10 2007