Dirichlet forms and ultrametric Cantor sets associated to higher-rank graphs

Abstract

The aim of this paper is to study the heat kernel and jump kernel of the Dirichlet form associated to ultrametric Cantor sets ∂ that is the infinite path space of the stationary k-Bratteli diagram , where is a finite strongly connected k-graph. The Dirichlet form which we are interested in is induced by an even spectral triple (CLip(), πφ, H, D, ) and is given by \[ Qs(f,g)=12 ∫ Tr( D-s [D,πφ(f)] [D,πφ(g)] ) \, d(φ), \] where is the space of choice functions on ∂ × ∂ . There are two ultrametrics, d(s) and dwδ, on ∂ which make the infinite path space an ultrametric Cantor set. The former d(s) is associated to the eigenvalues of Laplace-Beltrami operator s associated to Qs, and the latter dwδ is associated to a weight function wδ on , where δ∈ (0,1). We show that the Perron-Frobenius measure μ on ∂ has the volume doubling property with respect to both d(s) and dwδ and we study the asymptotic behaviors of the heat kernel associated to Qs. Moreover, we show that the Dirichlet form Qs coincides with a Dirichlet form QJs, μ which is associated to a jump kernel Js and the measure μ on ∂ , and we investigate the asymptotic behavior and moments of displacements of the process.