Template:Particular irrep

From Groupprops
Jump to: navigation, search
This article describes a particular irreducible linear representation for the following group: [[{{{group}}}]]. The representation is unique up to equivalence of linear representations and is irreducible, at least over its original field of definition in characteristic zero. The representation may also be definable over other characteristics by reducing the matrices modulo that characteristic, though it may behave somewhat differently in these characteristics.
For more on the linear representation theory of the group, see [[linear representation theory of {{{group}}}]].