English

Games on AF-algebras

Logic 2022-04-11 v1 Operator Algebras

Abstract

We analyze C\mathrm{C}^\ast-algebras, particularly AF-algebras, and their K0K_0-groups in the context of the infinitary logic Lω1ω\mathcal{L}_{\omega_1 \omega}. Given two separable unital AF-algebras AA and BB, and considering their K0K_0-groups as ordered unital groups, we prove that K0(A)ωαK0(B)K_0(A) \equiv_{\omega \cdot \alpha} K_0(B) implies AαBA \equiv_\alpha B, where MβNM \equiv_\beta N means that MM and NN agree on all sentences of quantifier rank at most β\beta. This implication is proved using techniques from Elliott's classification of separable AF-algebras, together with an adaptation of the Ehrenfeucht-Fra\"iss\'e game to the metric setting. We use moreover this result to build a family {Aα}α<ω1\{ A_\alpha \}_{\alpha < \omega_1} of pairwise non-isomorphic separable simple unital AF-algebras which satisfy AααAβA_\alpha \equiv_\alpha A_\beta for every α<β\alpha < \beta. In particular, we obtain a set of separable simple unital AF-algebras of arbitrarily high Scott rank. Next, we give a partial converse to the aforementioned implication, showing that AKω+2α+2BKA \otimes \mathcal{K} \equiv_{\omega + 2 \cdot \alpha +2} B \otimes \mathcal{K} implies K0(A)αK0(B)K_0(A) \equiv_\alpha K_0(B), for every unital C\mathrm{C}^\ast-algebras AA and BB.

Keywords

Cite

@article{arxiv.2204.04087,
  title  = {Games on AF-algebras},
  author = {Ben De Bondt and Andrea Vaccaro and Boban Velickovic and Alessandro Vignati},
  journal= {arXiv preprint arXiv:2204.04087},
  year   = {2022}
}

Comments

29 pages

R2 v1 2026-06-24T10:42:30.381Z