i1 : R = QQ[x_1,x_2,D_1,D_2,WeylAlgebra=>{x_1=>D_1,x_2=>D_2}] o1 = R o1 : PolynomialRing |
i2 : I = ideal(x_1, D_2-1) o2 = ideal (x , D - 1) 1 2 o2 : Ideal of R |
i3 : DintegrationClasses(I,{1,0}) o3 = HashTable{Boundaries => HashTable{0 => | D_2-1 |}} 1 => 0 Cycles => HashTable{0 => | 1 |} 1 => 0 1 2 1 VResolution => R <-- R <-- R 0 1 2 o3 : HashTable |