An Analytic Model for Left-Invertible Weighted Shifts on Directed Trees

Abstract

Let T be a rooted directed tree with finite branching index k T and let Sλ ∈ B(l2(V)) be a left-invertible weighted shift on T. We show that Sλ can be modelled as a multiplication operator Mz on a reproducing kernel Hilbert space H of E-valued holomorphic functions on a disc centered at the origin, where E:= S*λ. The reproducing kernel associated with H is multi-diagonal and of bandwidth k T. Moreover, H admits an orthonormal basis consisting of polynomials in z with at most k T+1 non-zero coefficients. As one of the applications of this model, we give a complete spectral picture of Sλ. Unlike the case E = 1, the approximate point spectrum of Sλ could be disconnected. We also obtain an analytic model for left-invertible weighted shifts on rootless directed trees with finite branching index.