A square matrix 
is said to be unipotent if 
, where 
is an identity matrix is
a nilpotent matrix (defined by the property that
is the zero
matrix for some positive integer matrix power 
. The corresponding identity, 
for some integer 
allows this definition to be generalized to other types of
algebraic systems.
An example of a unipotent matrix is a square matrix whose entries below the diagonal are zero and its entries on the diagonal are one. An explicit example of a unipotent matrix is given by
![[1 1 0 0; 0 1 1 0; 0 0 1 1; 0 0 0 1].](/images/equations/Unipotent/NumberedEquation1.svg) |
One feature of a unipotent matrix is that its matrix powers 
have entries which grow like a polynomial in 
.
A semisimple element 
of a group 
is unipotent if 
is a p-group,
where 
is the generalized fitting
subgroup.
