English

Separable representations, KMS states, and wavelets for higher-rank graphs

Operator Algebras 2015-05-15 v2

Abstract

Let Λ\Lambda be a strongly connected, finite higher-rank graph. In this paper, we construct representations of C(Λ)C^*(\Lambda) on certain separable Hilbert spaces of the form L2(X,μ)L^2(X,\mu), by introducing the notion of a Λ\Lambda-semibranching function system (a generalization of the semibranching function systems studied by Marcolli and Paolucci). In particular, when Λ\Lambda is aperiodic, we obtain a faithful representation of C(Λ)C^*(\Lambda) on L2(Λ,M)L^2(\Lambda^\infty, M), where MM is the Perron-Frobenius probability measure on the infinite path space Λ\Lambda^\infty recently studied by an Huef, Laca, Raeburn, and Sims. We also show how a Λ\Lambda-semibranching function system gives rise to KMS states for C(Λ)C^*(\Lambda). For the higher-rank graphs of Robertson and Steger, we also obtain a representation of C(Λ)C^*(\Lambda) on L2(X,μ)L^2(X, \mu), where XX is a fractal subspace of [0,1][0,1] by embedding Λ\Lambda^{\infty} into [0,1][0,1] as a fractal subset XX of [0,1][0,1]. In this latter case we additionally show that there exists a KMS state for C(Λ)C^*(\Lambda) whose inverse temperature is equal to the Hausdorff dimension of XX. Finally, we construct a wavelet system for L2(Λ,M)L^2(\Lambda^\infty, M) by generalizing the work of Marcolli and Paolucci from graphs to higher-rank graphs.

Keywords

Cite

@article{arxiv.1505.00485,
  title  = {Separable representations, KMS states, and wavelets for higher-rank graphs},
  author = {Carla Farsi and Elizabeth Gillaspy and Sooran Kang and Judith Packer},
  journal= {arXiv preprint arXiv:1505.00485},
  year   = {2015}
}

Comments

Modified hypotheses in Theorem 3.5

R2 v1 2026-06-22T09:27:21.921Z