%I #9 Jun 25 2014 09:43:01
%S 0,0,-1,0,0,2,0,0,0,-3,0,0,0,-3,16,0,0,0,-3,32,-135,0,0,0,-3,64,-405,
%T 1536,0,0,0,-3,128,-1215,6144,-21875,0,0,0,-3,256,-3645,24576,-109375,
%U 373248,0,0,0,-3,512,-10935,98304,-546875,2239488,-7411887,0,0,0,-3,1024,-32805,393216,-2734375,13436928,-51883209,167772160
%N Triangle read by rows: coefficients T(n,k) of a binomial decomposition of n*(-1)^n as Sum(k=0..n)T(n,k)*binomial(n,k).
%C T(n,k)=(-1)^k*k*(k-2)^(n-2) for k>1, while T(n,0)=0 and T(1,1)=-0^(n-1) by convention.
%H Stanislav Sykora, <a href="/A244140/b244140.txt">Table of n, a(n) for rows 0..100</a>
%H S. Sykora, <a href="http://dx.doi.org/10.3247/SL5Math14.004">An Abel's Identity and its Corollaries</a>, Stan's Library, Volume V, 2014, DOI 10.3247/SL5Math14.004. See eq.(21), with a=2, b=1.
%e The first rows of the triangle are:
%e 0,
%e 0, -1,
%e 0, 0, 2,
%e 0, 0, 0, -3,
%e 0, 0, 0, -3, 16,
%e 0, 0, 0, -3, 32, -135,
%e 0, 0, 0, -3, 64, -405, 1536,
%e 0, 0, 0, -3, 128, -1215, 6144, -21875,
%o (PARI) seq(nmax)={my(v,n,k,irow);
%o v = vector((nmax+1)*(nmax+2)/2);v[1]=0;
%o for(n=1,nmax,irow=1+n*(n+1)/2;
%o v[irow]=0;if(n==1,v[irow+1]=-1,v[irow+1]=0);
%o for(k=2,n,v[irow+k]=(-1)^k*k*(k-2)^(n-2);););
%o return(v);}
%o a=seq(100);
%Y Cf. A244116, A244117, A244118, A244119, A244120, A244121, A244122, A244123, A244124, A244125, A244126, A244127, A244128, A244129, A244130, A244131, A244132, A244133, A244134, A244135, A244136, A244137, A244138, A244139, A244141, A244142, A244143.
%K sign,tabl
%O 0,6
%A _Stanislav Sykora_, Jun 23 2014
|