Local and 2-local derivations of Cayley algebras

Abstract

The present paper is devoted to the description of local and 2-local derivations on Cayley algebras over an arbitrary field F. Given a Cayley algebra C with norm n, let C0 be its subspace of trace 0 elements. We prove that the space of all local derivations of C coincides with the Lie algebra \d∈ (C,n) | d(1)=0\ which is isomorphic to the orthogonal Lie algebra (C0,n). Further we prove that, surprisingly, the behavior of 2-local derivations depends on the Cayley algebra being split or division. Every 2-local derivation on the split Cayley algebra is a derivation, i.e. they form the exceptional Lie algebra g2(F) if charF≠ 2,3. On the other hand, on division Cayley algebras over a field F, the sets of 2-local derivations and local derivations coincide, and they are isomorphic to the Lie algebra (C0,n). As a corollary we obtain descriptions of local and 2-local derivations of the seven dimensional simple non-Lie Malcev algebras over fields of characteristic ≠ 2,3.