Maximum degree of irreducible representation: Difference between revisions
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==Definition== | ==Definition== | ||
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By default, when referring to the lcm of degrees of irreducible representations, we refer to the case of characteristic zero, and we can in particular take <math>K = \mathbb{C}</math>. | By default, when referring to the lcm of degrees of irreducible representations, we refer to the case of characteristic zero, and we can in particular take <math>K = \mathbb{C}</math>. | ||
==Facts== | |||
===Subgroups, quotients, and direct products=== | |||
* [[Maximum degree of irreducible representation of subgroup is less than or equal to maximum degree of irreducible representation of whole group]] | |||
* [[Maximum degree of irreducible representation of quotient group is less than or equal to maximum degree of irreducible representation of whole group]] | |||
* [[Maximum degree of irreducible representation of direct product is maximum of maximum degrees of irreducible representation of each direct factor]] | |||
===Field changes=== | |||
* [[Maximum degree of irreducible real representation is at most twice maximum degree of irreducible complex representation]] | |||
Revision as of 00:18, 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 is a group and is a field. The lcm of degrees of irreducible representations of is defined as the maximum of all the degrees of irreducible representations of over .
Typical context: finite group and splitting field
The typical context is where is a finite group and is a splitting field for . In particular, the characteristic of is either zero or is a prime not dividing the order of , and every irreducible representation of over any extension field of can be realized over .
Note that the lcm of degrees of irreducible representations depends (if at all) only on the characteristic of the field . 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 lcm of degrees of irreducible representations, we refer to the case of characteristic zero, and we can in particular take .
Facts
Subgroups, quotients, and direct products
- Maximum degree of irreducible representation of subgroup is less than or equal to maximum degree of irreducible representation of whole group
- Maximum degree of irreducible representation of quotient group is less than or equal to maximum degree of irreducible representation of whole group
- Maximum degree of irreducible representation of direct product is maximum of maximum degrees of irreducible representation of each direct factor