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D.4.3.1 cup
Procedure from library homolog.lib (see section homolog_lib).
- Usage:
cup(M,[,any,any]); M=module
- Compute:
cup-product Ext^1(M’,M’) x Ext^1(M’,M’) —> Ext^2(M’,M’), where
M’:=R^m/M, if M in R^m, R basering (i.e. M’:=coker(matrix(M))).
If called with >= 2 arguments: compute symmetrized cup-product
- Assume:
all Ext’s are finite dimensional
- Return:
- if called with 1 argument: matrix, the columns of the output present
the coordinates of b_i&b_j with respect to a kbase of Ext^2, where
b_1,b_2,... is a kbase of Ext^1 and & denotes cup product;
- if called with 2 arguments: matrix, the columns of the output
present the coordinates of (1/2)(b_i&b_j + b_j&b_i) with respect to
a kbase of Ext^2;
- if called with 3 arguments: list,
- Note:
printlevel >=1; shows what is going on.
printlevel >=2; shows result in another representation.
For computing cupproduct of M itself, apply proc to syz(M)!
Example:
LIB "homolog.lib";
int p = printlevel;
ring rr = 32003,(x,y,z),(dp,C);
ideal I = x4+y3+z2;
qring o = std(I);
module M = [x,y,0,z],[y2,-x3,z,0],[z,0,-y,-x3],[0,z,x,-y2];
print(cup(M));
→ 0,1,0, 0, 0,0,0,0,0,0,0, 0,0,0,0,0,0,
→ 0,0,-1,0, 0,1,0,0,0,0,0, 0,0,0,0,0,0,
→ 0,0,0, -1,0,0,0,0,0,1,0, 0,0,0,0,0,0,
→ 0,0,0, 0, 1,0,0,1,0,0,-1,0,0,1,0,0,0
print(cup(M,1));
→ 0,1,0,0,0,0,0,0,0,0,0,
→ 0,0,0,0,0,0,0,0,0,0,0,
→ 0,0,0,0,0,0,0,0,0,0,0,
→ 0,0,0,0,1,0,0,0,0,0,0
// 2nd EXAMPLE (shows what is going on)
printlevel = 3;
ring r = 0,(x,y),(dp,C);
ideal i = x2-y3;
qring q = std(i);
module M = [-x,y],[-y2,x];
print(cup(M));
→ // vdim (Ext^1) = 2
→ // kbase of Ext^1(M,M)
→ // - the columns present the kbase elements in Hom(F(1),F(0))
→ // - F(*) a free resolution of M
→ -1,0,
→ 0, y,
→ 0, 1,
→ -1,0
→ // lift kbase of Ext^1:
→ // - the columns present liftings of kbase elements into Hom(F(2),F(1))
→ // - F(*) a free resolution of M
→ 1,0,
→ 0,y,
→ 0,1,
→ 1,0
→ // vdim (Ext^2) = 2
→ // kbase of Ext^2(M,M)
→ // - the columns present the kbase elements in Hom(F(2),F(0))
→ // - F(*) is a a free resolution of M
→ -1,0,
→ 0, y,
→ 0, 1,
→ -1,0
→ // matrix of cup-products (in Ext^2)
→ 0,-1,0, 0,y,
→ 0,0, -y,y,0,
→ 0,0, -1,1,0,
→ 0,-1,0, 0,y
→ ////// end level 2 //////
→ // the associated matrices of the bilinear mapping 'cup'
→ // corresponding to the kbase elements of Ext^2(M,M) are shown,
→ // i.e. the rows of the final matrix are written as matrix of
→ // a bilinear form on Ext^1 x Ext^1
→ //-----component 1:
→ 0,1,
→ 0,0
→ //-----component 2:
→ 0, 0,
→ -1,1
→ ////// end level 3 //////
→ 0,1,0, 0,0,
→ 0,0,-1,1,0
printlevel = p;
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