Casimir operators of the exceptional group F4: the chain B4⊂ F4⊂ D13
Abstract
Expressions are given for the Casimir operators of the exceptional group F4 in a concise form similar to that used for the classical groups. The chain B4⊂ F4⊂ D13 is used to label the generators of F4 in terms of the adjoint and spinor representations of B4 and to express the 26-dimensional representation of F4 in terms of the defining representation of D13. Casimir operators of any degree are obtained and it is shown that a basis consists of the operators of degree 2, 6, 8 and 12.
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