0,5

Related to triangulations of an n-gon such that all internal vertices have valence at least 6.

G. Kuperberg, Spiders for rank 2 Lie algebras, Comm. Math. Phys. 180 (1996), 109-151

Alec Mihailovs, A Combinatorial Approach to Representations of Lie Groups and Algebras, Springer-Verlag New York (2003).

G. Kuperberg, ibid., arXiv:q-alg/9712003

lim a_(n+1)/a_n = 7.

a(0)=1, a(1)=0, a(2)=1 and (n+5)(n+6)a(n)=2(n-1)(2n+5)a(n-1)+(n-1)(19n+18)a(n-2)+14(n-1)(n-2)a(n-3) for n>2. - Alec Mihailovs (alec(AT)mihailovs.com), Feb 12 2005

c := x^2*y+x^3*y+x*y+x*y^2+y^2+x^3+x^4: mc := p->expand((p*c-subs(x=0, p*c)-subs(y=0, p*c))/x/y): g2 := proc(n) option remember; global x, y, c, mc; expand((mc(g2(n-1))-subs(x=0, mc(g2(n-1))))/x-subs(x=0, g2(n-1))) end: g2(0) := 1: a := seq(subs(x=0, y=0, g2(n)), n=0..50);

A059710:=rsolve({(n+5)*(n+6)*A(n)=2*(n-1)*(2*n+5)*A(n-1)+(n-1)*(19*n+18)*A(n-2)+\ 14*(n-1)*(n-2)*A(n-3), A(0)=1, A(1)=0, A(2)=1}, A(n), makeproc); (Mihailovs)

The analogous sequence for A_1 is A000108.

Adjacent sequences: A059707 A059708 A059709 this_sequence A059711 A059712 A059713

Sequence in context: A030003 A149175 A149176 this_sequence A149177 A149178 A152916

easy,nonn

Greg Kuperberg (greg(AT)math.ucdavis.edu), Feb 08 2001

Maple program from Alec Mihailovs, Jun 17 2003. See Mihailovs reference for proof that program is correct.

Removed "word" keyword because it is not appropriate. - Kang Seonghoon (lifthrasiir(AT)gmail.com), Oct 10 2008