Separable representations, KMS states, and wavelets for higher-rank graphs
Abstract
Let be a strongly connected, finite higher-rank graph. In this paper, we construct representations of on certain separable Hilbert spaces of the form , by introducing the notion of a -semibranching function system (a generalization of the semibranching function systems studied by Marcolli and Paolucci). In particular, when is aperiodic, we obtain a faithful representation of on , where is the Perron-Frobenius probability measure on the infinite path space recently studied by an Huef, Laca, Raeburn, and Sims. We also show how a -semibranching function system gives rise to KMS states for . For the higher-rank graphs of Robertson and Steger, we also obtain a representation of on , where is a fractal subspace of by embedding into as a fractal subset of . In this latter case we additionally show that there exists a KMS state for whose inverse temperature is equal to the Hausdorff dimension of . Finally, we construct a wavelet system for 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