The Stable Exotic Cuntz Algebras are Higher-Rank Graph Algebras

Abstract

For each odd integer n ≥ 3, we construct a rank-3 graph n with involution γn whose real C*-algebra C*R(n, γn) is stably isomorphic to the exotic Cuntz algebra EnR. This construction is optimal, as we prove that a rank-2 graph with involution (,γ) can never satisfy C*R(, γ)ME EnR, and the first author reached the same conclusion in previous work. Our construction relies on a rank-1 graph with involution (, γ) whose real C*-algebra C*R(, γ) is stably isomorphic to the suspension S R. In the Appendix, we show that the i-fold suspension Si R is stably isomorphic to a graph algebra iff -2 ≤ i ≤ 1.