Difference between revisions of "Irreducibility"
Jump to navigation
Jump to search
| Line 1: | Line 1: | ||
There are different types of representations that could be reducible and irreducible. It is particularly relevant in [[Group Theory]]<ref>{{:Video/Reducible and irreducible representation}}</ref><ref>{{:Video/What are...representations?}}</ref><ref>{{:Video/Symmetry and Group Theory: Systematic Reduction of a Reducible Representation}}</ref>, [[Quantum Mechanics]], and [[Quantum Chemistry]]. | There are different types of representations that could be reducible and irreducible. It is particularly relevant in [[Group Theory]]<ref>{{:Video/How to use Group Theory in Physics ?}}</ref><ref>{{:Video/Reducible and irreducible representation}}</ref><ref>{{:Video/What are...representations?}}</ref><ref>{{:Video/Symmetry and Group Theory: Systematic Reduction of a Reducible Representation}}</ref>, [[Quantum Mechanics]], and [[Quantum Chemistry]]. | ||
<noinclude> | <noinclude> | ||
Revision as of 04:43, 8 January 2023
There are different types of representations that could be reducible and irreducible. It is particularly relevant in Group Theory[1][2][3][4], Quantum Mechanics, and Quantum Chemistry.
References
- ↑ Vector7, ed. (Aug 23, 2021). How to use Group Theory in Physics ?. local page: Vector7.
- ↑ Physics Learning With Dr. Shaw, ed. (Sep 24, 2020). What is group? - Examples of Group - Uniqueness of Identity and Inverse - Group Theory - Part 1. local page: Physics Learning With Dr. Shaw.
- ↑ Tubbenhauer, Daniel (Mar 30, 2022). What are...representations?. local page: VisualMath.
- ↑ Tye, Jesse (Apr 13, 2020). Symmetry and Group Theory: Systematic Reduction of a Reducible Representation. local page: Jesse Tye.
Related Pages