Prime ideals in C*-algebras and applications to Lie theory

Abstract

We show that every proper, dense ideal in a C*-algebra is contained in a prime ideal. It follows that a subset generates a C*-algebra as a not necessarily closed ideal if and only if it is not contained in any prime ideal. This allows us to transfer Lie theory results from prime rings to C*-algebras. For example, if a C*-algebra A is generated by its commutator subspace [A,A] as a ring, then [[A,A],[A,A]] = [A,A]. Further, given Lie ideals K and L in A, then [K,L] generates A as a not necessarily closed ideal if and only if [K,K] and [L,L] do, and moreover this implies that [K,L]=[A,A]. We also discover new properties of the subspace generated by square-zero elements and relate it to the commutator subspace of a C*-algebra.