SINGULAR - A Computer Algebra System for Polynomial Computations

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SINGULAR - A Computer Algebra System for Polynomial Computations

Overview

Objects

Functionality

Libraries

Examples

Applications

Availability

History

Contributors

Future

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Sao Carlos, 08/02	http://www.singular.uni-kl.de

SINGULAR Examples

Build. Blocks

Comb. Appl.

HCA Proving

Arrangements

Branches

Classify

Coding

Deformations

Equidim Part

Existence

Finite Groups

Flatness

Genus

Hilbert Series

Membership

Nonnormal Locus

Normalization

Primdec

Puiseux

Plane Curves

Saturation

Solving

Space Curves

Spectrum

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Sao Carlos, 08/02	http://www.singular.uni-kl.de

SINGULAR Applications

Robotics

Circuit Design

Medicine

Glass Melting

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Sao Carlos, 08/02	http://www.singular.uni-kl.de

Study the curve in P¹x P¹ defined by the tangency condition more closely. There are two main cases of which we will only consider the so-called asymmetric case here:

In this case, the ideal I is generated by el-g², ek-gf, ak-dc, ah-c² and the 2-minors of the matrix

where

Computational Task: Remove excess components E₁, E₂ and E₃ from I by saturation! The ring in which these computations need to be done only contains 2 parameters now:

The E_i do not involve s and t, so we can harmlessly treat s and t as variables - as long as we interpret the result carefully afterwards. The Subsequent Computational Task.
The SINGULAR computation.