Singular

I think it is worth mentioning that by a theorem of Saito any weighted homogeneous polynomial defining an IHS belongs to its Jacobi ideal and viceversa, therefore they have the same Turina and Milnor numbers.

I recomputed the examples:
LIB"sing.lib";
ring r = 0,(x,y,z),ds;
poly f = x2 + y3 + z3 +zy;
poly g = x2 + y3 + y4 +yz2;
milnor(f); tjurina(f); //1
milnor(g); tjurina(g); //4

The answer is correct since f is contained in the ideal of the partials.
f is an A_1 and g a D_4 singularity. You get this by applying classify
from classify.lib.

Please provide the full Singular input for your examples.

Bonjour,


can you me say why the procedure milnor and tjurina gives the same numbers for

{x^{2} + y^{3} + z^{3} +zy=0} or

{x^{2} + y^{3} + y^{4} +yz^{2}=0} ?

thanks.
kaddar.