Non-associative Frobenius algebras of type G2 and F4

Abstract

Very recently, Maurice Chayet and Skip Garibaldi have introduced a class of commutative non-associative algebras, for each simple linear algebraic group over an arbitrary field (with some minor restriction on the characteristic). We give an explicit description of these algebras for groups of type G2 and F4 in terms of the octonion algebras and the Albert algebras, respectively. As a byproduct, we determine all possible invariant commutative algebra products on the representation with highest weight 2ω1 for G2 and on the representation with highest weight 2ω4 for F4. It had already been observed by Chayet and Garibaldi that the automorphism group for the algebras for type F4 is equal to the group of type F4 itself. Using our new description, we are able to show that the same result holds for type G2.