Let L$L$ be classical Lie algebra of type A_5$A_5$ over field of characteristic 2, M2; let - factoralgebra L/Z(L) where Z(L)$M$ be the quotient -$L/Z(L)$ modulo its center of L$Z(L)$.
What about the group of automorphisms of M?
Does anybody know the answer or at least some related papers where automorphisms of classical Lie algebras over the fieldfields of prime characteristic are being studied?
