Choose an affine covering of P², and assume that in such an open affine set the curve C is defined by f=0.

We know:

• the ideal   Sing(f):= < f, f_x, f_y >   defines the singular locus

• the ideal   Sing(Sing(f)):=< f, f_x, f_y, det(Hess(f)) >   defines the non-nodal locus

• the ideal   S:= Sing(Sing(Sing(f)))   defines the non-nodal-cuspidal locus

• delta(C,x)=1 in nodal or cuspidal singularities, so we have just to count them.

• the singular points different from cusps and nodes are obtained by a primary decomposition of S.