F_{4} (mathematics)
In mathematics, F_{4} is the name of a Lie group and also its Lie algebra f_{4}. It is one of the five exceptional simple Lie groups. F_{4} has rank 4 and dimension 52. The compact form is simply connected and its outer automorphism group is the trivial group. Its fundamental representation is 26dimensional.
Algebraic structure → Group theory Group theory 



Infinite dimensional Lie group

Group theory → Lie groups Lie groups 


The compact real form of F_{4} is the isometry group of a 16dimensional Riemannian manifold known as the octonionic projective plane OP^{2}. This can be seen systematically using a construction known as the magic square, due to Hans Freudenthal and Jacques Tits.
There are 3 real forms: a compact one, a split one, and a third one. They are the isometry groups of the three real Albert algebras.
The F_{4} Lie algebra may be constructed by adding 16 generators transforming as a spinor to the 36dimensional Lie algebra so(9), in analogy with the construction of E_{8}.
In older books and papers, F_{4} is sometimes denoted by E_{4}.
Algebra
Dynkin diagram
The Dynkin diagram for F_{4} is:
Weyl/Coxeter group
Its Weyl/Coxeter group is the symmetry group of the 24cell: it is a solvable group of order 1152. It has minimal faithful degree [1] which is realized by the action on the 24cell.
Cartan matrix
F_{4} lattice
The F_{4} lattice is a fourdimensional bodycentered 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. The 24 Hurwitz quaternions of norm 1 form the vertices of a 24cell centered at the origin.
Roots of F_{4}
The 48 root vectors of F_{4} can be found as the vertices of the 24cell in two dual configurations, representing the vertices of a disphenoidal 288cell if the edge lengths of the 24cells are equal:
24cell vertices:
 24 roots by (±1,±1,0,0), permuting coordinate positions
Dual 24cell vertices:
 8 roots by (±1, 0, 0, 0), permuting coordinate positions
 16 roots by (±½, ±½, ±½, ±½).
F_{4} polynomial invariant
Just as O(n) is the group of automorphisms which keep the quadratic polynomials x^{2} + y^{2} + ... invariant, F_{4} is the group of automorphisms of the following set of 3 polynomials in 27 variables. (The first can easily be substituted into other two making 26 variables).
Where x, y, z are real valued and X, Y, Z are octonion valued. Another way of writing these invariants is as (combinations of) Tr(M), Tr(M^{2}) and Tr(M^{3}) of the hermitian octonion matrix:
The set of polynomials defines a 24 dimensional compact surface.
Representations
The characters of finite dimensional representations of the real and complex Lie algebras and Lie groups are all given by the Weyl character formula. The dimensions of the smallest irreducible representations are (sequence A121738 in the OEIS):
 1, 26, 52, 273, 324, 1053 (twice), 1274, 2652, 4096, 8424, 10829, 12376, 16302, 17901, 19278, 19448, 29172, 34749, 76076, 81081, 100776, 106496, 107406, 119119, 160056 (twice), 184756, 205751, 212992, 226746, 340119, 342056, 379848, 412776, 420147, 627912…
The 52dimensional representation is the adjoint representation, and the 26dimensional one is the tracefree part of the action of F_{4} on the exceptional Albert algebra of dimension 27.
There are two nonisomorphic irreducible representations of dimensions 1053, 160056, 4313088, etc. The fundamental representations are those with dimensions 52, 1274, 273, 26 (corresponding to the four nodes in the Dynkin diagram in the order such that the double arrow points from the second to the third).
References
 Adams, J. Frank (1996), Lectures on exceptional Lie groups, Chicago Lectures in Mathematics, University of Chicago Press, ISBN 9780226005263, MR 1428422
 John Baez, The Octonions, Section 4.2: F_{4}, Bull. Amer. Math. Soc. 39 (2002), 145205. Online HTML version at http://math.ucr.edu/home/baez/octonions/node15.html.
 Chevalley C, Schafer RD (February 1950). "The Exceptional Simple Lie Algebras F(4) and E(6)". Proc. Natl. Acad. Sci. U.S.A. 36 (2): 137–41. Bibcode:1950PNAS...36..137C. doi:10.1073/pnas.36.2.137. PMC 1063148. PMID 16588959.
 Jacobson, Nathan (19710601). Exceptional Lie Algebras (1st ed.). CRC Press. ISBN 0824713265.