English

Operator $K$-theoretic analysis of random adjacency matrices

Operator Algebras 2025-05-22 v3

Abstract

We appeal to results from combinatorial random matrix theory to deduce that various random graph C\mathrm{C}^*-algebras are asymptotically almost surely Kirchberg algebras with trivial K1K_1. This in particular implies that, with high probability, the stable isomorphism classes of such algebras are exhausted by variations of Cuntz algebras that we term 'Cuntz polygons'. These probabilistically generic algebras can be assembled into a Fra\"{i}ss\'{e} class whose limit structure G\mathbb{G} is consequently relevant to any KK-theoretic analysis of finite graph C\mathrm{C}^*-algebras. We also use computer simulations to experimentally verify the behaviour predicted by theory and to estimate the asymptotic probabilities of obtaining stable isomorphism classes represented by actual Cuntz algebras. These probabilities depend on the frequencies with which the Sylow pp-subgroups of K0K_0 are cyclic and in some cases can be computed from existing theory. For random symmetric rr-regular multigraphs, current theory can describe these frequencies for finite sets of odd primes pp not dividing r1r-1. A novel aspect of the collected data is the observation of new heuristics outside of this case, leading to a conjecture for the asymptotic probability of these graphs yielding C\mathrm{C}^*-algebras stably isomorphic to Cuntz algebras. For other models of random multigraphs including Bernoulli (di)graphs, the data also allow us to estimate and heuristically explain the (surprisingly high) asymptotic probabilities of exact isomorphism to a Cuntz algebra. Recognising the role played by Cuntz--Krieger algebras in the theory of symbolic dynamics, we also collect supplemental data to estimate (and in some cases, actually compute) the asymptotic probability of a random subshift of finite type being flow equivalent to a full shift.

Keywords

Cite

@article{arxiv.2307.01861,
  title  = {Operator $K$-theoretic analysis of random adjacency matrices},
  author = {Bhishan Jacelon and Igor Khavkine},
  journal= {arXiv preprint arXiv:2307.01861},
  year   = {2025}
}

Comments

Minor revision featuring a change of title. Summary data files and Python scripts included as ancillary files. This version appears in the New York Journal of Mathematics https://nyjm.albany.edu/j/2025/31-28.html

R2 v1 2026-06-28T11:22:07.396Z