Equivalence of the Stone-Weierstrass conjectures for C* and JB*-algebras

## Abstract A Banach space __X__ is said to have the __alternative Daugavet property__ if for every (bounded and linear) rank‐one operator __T__: __X__ → __X__ there exists a modulus one scalar __ω__ such that ∥Id+__ωT__ ∥ = 1 + ∥__T__ ∥. We give geometric characterizations of this property in the

We show that every \(C^{*}\)-algebra with real rank zero has exponential rank \(\leqslant 1+\varepsilon\). Consequently, \(C^{*}\)-algebras with real rank zero have the property weak (FU). We also show that if \(A\) is a \(\sigma\)-unital \(C^{*}\)-algebra with real rank zero, stable rank one, and t

Given a C\*-dynamical system (A, G, :), we discuss conditions under which subalgebras of the multiplier algebra M(A) consisting of fixed points for : are Morita Rieffel equivalent to ideals in the crossed product of A by G. In case G is abelian we also develop a spectral theory, giving a necessary a