New Number: 1.1 | AESZ: 1 | Superseeker: 575 63441275 | Hash: c86f1c284d8c5119801c6ba1343172bb
Degree: 1
\(\theta^4-5 x(5\theta+1)(5\theta+2)(5\theta+3)(5\theta+4)\)
Maple LaTex Coefficients of the holomorphic solution: 1, 120, 113400, 168168000, 305540235000, ... --> OEIS Normalized instanton numbers (n0=1): 575, 121850, 63441275, 48493506000, 45861177777525, ... ; Common denominator:...
Discriminant
\(1-3125z\)
Local exponents
Note:
A-incarnation: $X(5) \subset P^4$
B-incarnation: mirror quintic.
P. Candelas, X. de la Ossa, D. Green, L. Parkes,{\em An exactly soluble superconformal theory from a mirror pair of Calabi-Yau manifolds}, Phys. Lett. B 258 (1991), no.1-2, 118-126.
Integral instantons: ,...
Coefficients of the Yukawa coupling: 1, 575, 975375, 1712915000, 3103585359375, 5732647222191200, 10724388861212440200, 20243246069160012225125,...
Coefficients of the q-coordinate : 0, 1, -770, 171525, -81623000, -35423171250, -54572818340154, -71982448083391590,...
| Gopakumar-Vafa invariants |
---|
g=0 | ,... |
g=1 | ,... |
g=2 | ,... |
Explicit solution
\(A_{n}=\frac{(5n)!}{n!^5}\)
Maple LaTex Characteristic classes:
Monodromy (with respect to Frobenius basis)
Basis of the Doran-Morgan lattice