Maximum degree of irreducible representation: Difference between revisions

Revision as of 00:26, 13 April 2011

This term is related to: linear representation theory
View other terms related to linear representation theory | View facts related to linear representation theory

This article defines an arithmetic function on groups
View other such arithmetic functions

Definition

For a group over a field

Suppose $G$ is a group and $K$ is a field. The maximum degree of irreducible representation of $G$ is defined as the maximum of all the degrees of irreducible representations of $G$ over $K$ .

Typical context: finite group and splitting field

The typical context is where $G$ is a finite group and $K$ is a splitting field for $G$ . In particular, the characteristic of $K$ is either zero or is a prime not dividing the order of $G$ , and every irreducible representation of $G$ over any extension field of $K$ can be realized over $K$ .

Note that the maximum degree of irreducible representation depends (if at all) only on the characteristic of the field $K$ . This is because the degrees of irreducible representations over a splitting field depend only on the characteristic of the field.

Default case: characteristic zero

By default, when referring to the maximum degree of irreducible representation, we refer to the case of characteristic zero, and we can in particular take $K = C$ .

Facts

Subgroups, quotients, and direct products

Field changes

Maximum degree of irreducible real representation is at most twice maximum degree of irreducible complex representation

Particular cases

For any finite abelian group, all the irreducible representations over a splitting field are one-dimensional, so the maximum degree of irreducible representation over any splitting field is one-dimensional. The situation may be different over non-splitting fields.

Group	Order	Second part of GAP ID	Maximum degree of irreducible representation over $C$	Maximum degree of irreducible representation over $R$	Maximum degree of irreducible representation over $Q$	General note on degrees of irreducible representations
trivial group	1	1	1	1	1	always 1, regardless of the field
cyclic group:Z2	2	1	1	1	1	always 1, any field of characteristic not 2
cyclic group:Z3	3	1	1	2	2	either 1 or 2, depending on whether the field is a splitting field
cyclic group:Z4	4	1	1	2	2	either 1 or 2, depending on whether the field is a splitting field
Klein four-group	4	2	1	1	1	always 1, any field of characteristic not 2
cyclic group:Z5	5	1	1	2	4	1, 2, or 4, depending on how $x^{4} + x^{3} + x^{2} + x + 1$ splits in the field

@@ Line 30: / Line 30: @@
 * [[Maximum degree of irreducible real representation is at most twice maximum degree of irreducible complex representation]]
+==Particular cases==
+For any [[finite abelian group]], all the irreducible representations over a splitting field are one-dimensional, so the maximum degree of irreducible representation over any splitting field is one-dimensional. The situation may be different over non-splitting fields.
+{| class="sortable" border="1"
+! Group !! Order !! Second part of GAP ID !! Maximum degree of irreducible representation over <math>\mathbb{C}</math> !! Maximum degree of irreducible representation over <math>\R</math> !! Maximum degree of irreducible representation over <math>\mathbb{Q}</math> !! General note on degrees of irreducible representations
+|-
+| [[trivial group]] || 1 || 1 || 1 || 1 || 1 || always 1, regardless of the field
+|-
+| [[cyclic group:Z2]] || 2 || 1 || 1 || 1 || 1 || always 1, any field of characteristic not 2
+|-
+| [[cyclic group:Z3]] || 3 || 1 || 1 || 2 || 2 || either 1 or 2, depending on whether the field is a splitting field
+|-
+| [[cyclic group:Z4]] || 4 || 1 || 1 || 2 || 2 || either 1 or 2, depending on whether the field is a splitting field
+|-
+| [[Klein four-group]] || 4 || 2 || 1 || 1 || 1 || always 1, any field of characteristic not 2
+|-
+| [[cyclic group:Z5]] || 5 || 1 || 1 || 2 || 4 || 1, 2, or 4, depending on how <math>x^4 + x^3 + x^2 + x + 1</math> splits in the field
+|}