C preface.tex 1. Preface
I 1.0. Unipot
S 1.1. Root Systems
S 1.2. Citing Unipot
C unipot.tex 2. The GAP Package Unipot
S 2.1. General functionality
F 2.1. UnipotChevInfo
S 2.2. Unipotent subgroups of Chevalley groups
F 2.2. IsUnipotChevSubGr
F 2.2. UnipotChevSubGr
F 2.2. PrintObj!for `UnipotChevSubGr'
F 2.2. ViewObj!for `UnipotChevSubGr'
F 2.2. One!for `UnipotChevSubGr'
F 2.2. OneOp!for `UnipotChevSubGr'
F 2.2. Size!for `UnipotChevSubGr'
F 2.2. RootSystem!for `UnipotChevSubGr'
F 2.2. PositiveRootsFC
F 2.2. NegativeRootsFC
F 2.2. GeneratorsOfGroup!for `UnipotChevSubGr'
F 2.2. Representative
F 2.2. CentralElement
S 2.3. Elements of unipotent subgroups of Chevalley groups
F 2.3. IsUnipotChevElem
F 2.3. IsUnipotChevRepByRootNumbers
F 2.3. IsUnipotChevRepByFundamentalCoeffs
F 2.3. IsUnipotChevRepByRoots
F 2.3. UNIPOT_DEFAULT_REP
F 2.3. UnipotChevElemByRootNumbers
F 2.3. UnipotChevElemByRootNumbers
F 2.3. UnipotChevElemByRN
F 2.3. UnipotChevElemByRN
F 2.3. UnipotChevElemByFundamentalCoeffs
F 2.3. UnipotChevElemByFundamentalCoeffs
F 2.3. UnipotChevElemByFC
F 2.3. UnipotChevElemByFC
F 2.3. UnipotChevElemByRoots
F 2.3. UnipotChevElemByRoots
F 2.3. UnipotChevElemByR
F 2.3. UnipotChevElemByR
F 2.3. UnipotChevElemByRootNumbers!element conversion
F 2.3. UnipotChevElemByFundamentalCoeffs!element conversion
F 2.3. UnipotChevElemByRoots!element conversion
F 2.3. CanonicalForm
F 2.3. PrintObj!for `UnipotChevElem'
F 2.3. ViewObj!for `UnipotChevElem'
F 2.3. ShallowCopy!for `UnipotChevElem'
F 2.3. Equality!for UnipotChevElem
I 2.3. \\=
F 2.3. Less than!for UnipotChevElem
I 2.3. \\\<
F 2.3. Multiplication!for UnipotChevElem
I 2.3. \\\*
F 2.3. OneOp!for `UnipotChevElem'
F 2.3. Inverse!for `UnipotChevElem'
F 2.3. InverseOp!for `UnipotChevElem'
F 2.3. IsOne
F 2.3. Powers!of UnipotChevElem
F 2.3. Conjugation!of UnipotChevElem
F 2.3. Comm!for `UnipotChevElem'
F 2.3. Comm!for `UnipotChevElem'
F 2.3. IsRootElement
F 2.3. IsCentral
S 2.4. Symbolic computation