- In mathematics, a
unipotent element r of a ring R is one such that r − 1 is a
nilpotent element; in
other words, (r − 1)n is zero for some n. In particular...
- &0&*\end{array}}\right)} . The
group U {\displaystyle U} is an
example of a
unipotent linear algebraic group, the
group B {\displaystyle B} is an
example of...
-
containing it, both
invariant under the
Frobenius map F, and
write U for the
unipotent radical of B. If we
choose a
representative w′ of the
normalizer N(T)...
- In mathematics, a
unipotent representation of a
reductive group is a
representation that has some
similarities with
unipotent conjugacy classes of groups...
-
unipotent cell is the
concept that one stem cell has the
capacity to
differentiate into only one cell type. It is
currently unclear if true
unipotent...
-
subgroup of
unipotent elements in the
radical is
called the
unipotent radical, it
serves to
define reductive groups.
Reductive group Unipotent group "Radical...
-
largest smooth connected unipotent normal subgroup of G {\displaystyle G} is trivial. This
normal subgroup is
called the
unipotent radical and is denoted...
- the
capacity to
differentiate into only one cell type,
meaning they are
unipotent stem cells. In embryology,
precursor cells are a
group of
cells that later...
- the
variety of
nilpotent elements in a
semisimple Lie algebra, or the
unipotent elements of a
reductive algebraic group,
introduced by
Tonny Albert Springer...
- theory.
Around 1990, she
proved a
group of
major theorems concerning unipotent flows on
homogeneous spaces,
known as Ratner's theorems.
Ratner was elected...
