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Moduli Spaces for Space Curve Singularities
Tasks: Given the presentation matrix of a
quasihomogeneous space curve singularity,
 find a versal family of
semiquasihomogeneous singularities with this
fixed initial part,
 compute the kernel L of the
KodairaSpencer map of this family,
 compute the stratification of the base
space of the versal
family w.r.t. the Hilbert function of T^{1} and the
invariants obtained from the central series of L.
Stratification  An Example
