Wold-type decomposition for left-invertible weighted shifts on a rootless directed tree
Abstract
Let Sλb be a bounded left-invertible weighted shift on a rootless directed tree T=(V, E). We address the question of when Sλb has Wold-type decomposition. We relate this problem to the convergence of the series Σn = 1∞ Σu ∈ Gv, n Gv, n-1 (λb(n)(u)λb(n)(v))2, v ∈ V, involving the moments λb(n) of S*λb, where Gv, n=nnv. The main result of this paper characterizes all bounded left-invertible weighted shifts Sλb on T, which have Wold-type decomposition.
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