A characterization of the Razak-Jacelon algebra

Abstract

Combining Elliott, Gong, Lin and Niu's result and Castillejos and Evington's result, we see that if A is a simple separable nuclear monotracial C*-algebra, then A is isomorphic to W where W is the Razak-Jacelon algebra. In this paper, we give another proof of this. In particular, we show that if D is a simple separable nuclear monotracial M2∞-stable C*-algebra which is KK-equivalent to \0\, then D is isomorphic to W without considering tracial approximations of C*-algebras with finite nuclear dimension. Our proof is based on Matui and Sato's technique, Schafhauser's idea in his proof of the Tikuisis-White-Winter theorem and properties of Kirchberg's central sequence C*-algebra F(D) of D. Note that some results for F(D) are based on Elliott-Gong-Lin-Niu's stable uniqueness theorem. Also, we characterize W by using properties of F(W). Indeed, we show that a simple separable nuclear monotracial C*-algebra D is isomorphic to W if and only if D satisfies the following properties: (i) for any θ∈ [0,1], there exists a projection p in F(D) such that τD, ω(p)=θ, (ii) if p and q are projections in F(D) such that 0<τD, ω(p)=τD, ω(q), then p is Murray-von Neumann equivalent to q, (iii) there exists an injective homomorphism from D to W.