A287047 a(n) is the number of rooted maps with n edges and 7 faces on an orientable surface of genus 1.
60060, 3944928, 129726760, 2908358552, 50534154408, 729734918432, 9145847808784, 102432266545800, 1046677747672360, 9908748651241088, 87930943305742512, 738178726378902064, 5905479331377981200, 45289976937922983360, 334600965220354244896, 2391127223524518889064, 16585285393291515557928
Offset: 8
Keywords
Links
- Sean R. Carrell, Guillaume Chapuy, Simple recurrence formulas to count maps on orientable surfaces, arXiv:1402.6300 [math.CO], 2014.
Crossrefs
Programs
-
Mathematica
Q[0, 1, 0] = 1; Q[n_, f_, g_] /; n < 0 || f < 0 || g < 0 = 0; Q[n_, f_, g_] := Q[n, f, g] = 6/(n + 1) ((2 n - 1)/3 Q[n - 1, f, g] + (2 n - 1)/3 Q[n - 1, f - 1, g] + (2 n - 3) (2 n - 2) (2 n - 1)/12 Q[n - 2, f, g - 1] + 1/2 Sum[l = n - k; Sum[v = f - u; Sum[j = g - i; Boole[l >= 1 && v >= 1 && j >= 0] (2 k - 1) (2 l - 1) Q[k - 1, u, i] Q[l - 1, v, j], {i, 0, g}], {u, 1, f}], {k, 1, n}]); a[n_] := Q[n, 7, 1]; Table[a[n], {n, 8, 24}] (* Jean-François Alcover, Oct 18 2018 *) -
PARI
A000108_ser(N) = my(x='x+O('x^(N+1))); (1 - sqrt(1-4*x))/(2*x); A287047_ser(N) = { my(y = A000108_ser(N+1)); -4*y*(y-1)^8*(184142*y^7 + 1083793*y^6 - 1540136*y^5 - 1481152*y^4 + 2626176*y^3 - 737232*y^2 - 184896*y + 64320)/(y-2)^23; }; Vec(A287047_ser(17))