The algebra and discrete mathematics group of Prof. Dr. Bettina Eick is one of the four centers that take care of the computer algebra system GAP and its development. The following table lists the packages that have been implemented at Braunschweig. Some of them are also available at the GAP-homepage.
Titel:Kurzbeschreibung:Autor:
AcLib
A library and algorithms for almost crystallographic groups
Dekimpe and Eick
Alnuth
Methods for Algebraic number theory and an interface to KANT
Assmann, Distler and Eick
AutPGroup
Computing automorphisms of p-groups
Eick and O'Brien
AutVAbel
Computing automorphism groups of polycyclic space groups
Eick
ccalgs
Algorithms for nilpotent associative algebras and coclass theory
Eick and Moede
ClassTwoAlg
Enumeration of the isomorphism classes of class two nilpotent algebras over arbitrary fields
Eick and Wesche
CoClass
A library and algorithms for pro-p-groups of finite coclass
Eick
Cryst
Computing with crystallographic groups
Eick, Gähler and Nickel
Cubefree
Computing groups of cube-free order
Dietrich
FGA
Computing with finitely generated subgroups of free groups
Sievers
Format
Computing with formation theoretic subgroups
Eick and Wright
GalGrp
Galois groups of certain maximal 2-extensions of Q
Eick
GrpConst
Construction of small groups
Besche and Eick
HallPoly
Computation of Hall polynomials for finitely generated torsion-free nilpotent groups
Cant and Eick
LiePRing
The Lie rings of order at most p^7
Eick and Vaughan-Lee
ModIsom
Automorphisms and Isomorphisms for nilpotent associative algebras
Eick and Konovalov
Polenta
Polycyclic presentations for matrix groups
Assmann
Polycyclic
Computations with polycyclic groups
Eick and Nickel
RadiRoot
Expressing the roots of a rational polynomial by radicals
Distler
SmallGroups
A library of groups of small order
Besche, Eick and O'Brien
SglPPow
The groups of order 3^8 and p^7
Eick and Vaughan-Lee
TGroupIsom
The isomorphism problem for torsion free nilpotent groups of Hirsch length at most 5
Eick and Engel