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D.5.3.2 esIdeal
Procedure from library equising.lib (see equising_lib).
- Usage:
- esIdeal(f); f poly
- Assume:
- f is a reduced bivariate polynomial, the basering has precisely
two variables, is local and no qring, and the characteristic of
the ground field does not divide mult(f).
- Return:
- list of two ideals:
| _[1]: equisingularity ideal of f (in sense of Wahl)
_[2]: equisingularity ideal of f with fixed section
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- Note:
- if some of the above condition is not satisfied then return
value is list(0,0).
Example:
| LIB "equising.lib";
ring r=0,(x,y),ds;
poly f=x7+y7+(x-y)^2*x2y2;
list K=esIdeal(f);
==> polynomial is Newton degenerated !
==>
==> //
==> // versal deformation with triv. section
==> // =====================================
==> //
==> //
==> // Compute equisingular Stratum over Spec(C[t]/t^2)
==> // ================================================
==> //
==> // finished
==> //
option(redSB);
// Wall's equisingularity ideal:
std(K[1]);
==> _[1]=4x4y-10x2y3+6xy4+21x6+14y6
==> _[2]=4x3y2-6x2y3+2xy4+7x6
==> _[3]=x2y4-xy5
==> _[4]=x7
==> _[5]=xy6
==> _[6]=y7
ring rr=0,(x,y),ds;
poly f=x4+4x3y+6x2y2+4xy3+y4+2x2y15+4xy16+2y17+xy23+y24+y30+y31;
list K=esIdeal(f);
==> polynomial is Newton degenerated !
==>
==> //
==> // versal deformation with triv. section
==> // =====================================
==> //
==> //
==> // Compute equisingular Stratum over Spec(C[t]/t^2)
==> // ================================================
==> //
==> // finished
==> //
vdim(std(K[1]));
==> 68
// the latter should be equal to:
tau_es(f);
==> 68
| See also:
esStratum;
tau_es.
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