F4 (mathematics)

In mathematics, F₄ is the name of a Lie group and also its Lie algebra <math>\mathfrak{f}_4<math>. It is one of the five exceptional simple Lie groups. F₄ has rank 4 and dimension 52. Its center is the trivial subgroup. Its outer automorphism group is the trivial group. Its fundamental representation is 26-dimensional.

Contents

1 Algebra

1.1 Dynkin diagram
1.2 Roots of F4
1.3 Weyl/Coxeter group
1.4 Cartan matrix
1.5 F4 lattice

Algebra

The F₄ Lie algebra may be constructed by adding 16 generators transforming as a spinor to the 36-dimensional Lie algebra so(9), in analogy with the construction of E₈.

Dynkin diagram

Missing image
Dynkin_diagram_F4.png
Dynkin diagram of F_4

Roots of F₄

Simple roots

Weyl/Coxeter group

Its Weyl/Coxeter group is the symmetry group of the 24-cell.

Cartan matrix

<math>

\begin{pmatrix} 2&-1&0&0\\ -1&2&-2&0\\ 0&-1&2&-1\\ 0&0&-1&2 \end{pmatrix} <math>

F₄ lattice

The F₄ lattice is a four dimensional body-centered cubic lattice (i.e. the union of two hypercubic lattices, each lying in the center of the other). They form a ring called the Hurwitz quaternion ring.

Exceptional Lie groups

E₆ | E₇ | E₈ | F₄ | G₂

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Categories: Lie groups

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