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D.4.5 curveInv_lib
- Library:
- curveInv.lib
- Purpose:
- A library for computing invariants of curves
- Author:
- Peter Chini, chini@rhrk.uni-kl.de
- Overview:
- This library provides a collection of procedures for computing invariants
of curve singularities. Invariants that can be computed are:
- the delta invariant
- the multiplicity of the conductor: the length of Normalization(R)/C, where C denotes the conductor
- the Deligne number
- the colength of derivations along the normalization - the length of Der(Normalization(R/I)) / R/IIn addition, it is possible to compute the conductor of a ring S = R/I, where R is a (localized) polynomial ring.
- Theory:
- Computing the Deligne number of curve singularities and an algorithmic framework for
differential algebras in SINGULAR;
Chapter 5 - Master's Thesis of Peter Chini - August 2015
Procedures:
D.4.5.1 curveDeltaInv computes the delta invariant of R/I for a given ideal I D.4.5.2 curveConductorMult returns the multiplicity of the conductor of R/I D.4.5.3 curveDeligneNumber computes the Deligne number of R/I D.4.5.4 curveColengthDerivations returns the colength of derivations, the length of Der(Normalization(R/I))/Der(R/I)