Orthogonal Idempotents in Symmetric Tensor Powers of Composition Algebras

Abstract

We explicitly find a complete set of 14(n+2)2 (resp. 14(n+1)(n+3)) primitive orthogonal idempotents in SymnHRC if n is even (resp. odd), where SymnH is the n th symmetric power of the Hamilton quaternion algebra H. We also give a complete set of 14(n+2)2 (resp. 18(n+1)(n+3)) primitive orthogonal idempotents in SymnH if n is even (resp. odd). Moreover, we explicitly find a complete set of 124(n+2)(n+3)(n+4) (resp. 124(n+1)(n+3)(n+5)) primitive orthogonal idempotents in the associative subalgebra ( SymnH· Z( SymnO))RC of SymnORC if n is even (resp. odd), where SymnO is the n th symmetric power of the Cayley octonion algebra O and Z( SymnO) is its center. We also give a complete set of 124(n+2)(n+3)(n+4) (resp. 148(n+1)(n+3)(n+5)) primitive orthogonal idempotents in the associative subalgebra SymnH· Z( SymnO) of SymnO if n is even (resp. odd).