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4.4.3 ideal operations
+
- addition (concatenation of the generators and simplification)
*
- multiplication (with ideal, poly, vector, module; simplification in case of
multiplication with ideal)
^
- exponentiation (by a non-negative integer)
- ideal_expression
[ intvec_expression ]
- are polynomial generators of the ideal, index 1 gives the first generator.
Note: For simplification of an ideal, see also simplify.
Example:
| ring r=0,(x,y,z),dp;
ideal I = 0,x,0,1;
I;
==> I[1]=0
==> I[2]=x
==> I[3]=0
==> I[4]=1
I + 0; // simplification
==> _[1]=1
ideal J = I,0,x,x-z;;
J;
==> J[1]=0
==> J[2]=x
==> J[3]=0
==> J[4]=1
==> J[5]=0
==> J[6]=x
==> J[7]=x-z
I * J; // multiplication with simplification
==> _[1]=1
I*x;
==> _[1]=0
==> _[2]=x2
==> _[3]=0
==> _[4]=x
vector V = [x,y,z];
print(V*I);
==> 0,x2,0,x,
==> 0,xy,0,y,
==> 0,xz,0,z
ideal m = maxideal(1);
m^2;
==> _[1]=x2
==> _[2]=xy
==> _[3]=xz
==> _[4]=y2
==> _[5]=yz
==> _[6]=z2
ideal II = I[2..4];
II;
==> II[1]=x
==> II[2]=0
==> II[3]=1
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