Subnormal weighted shifts on directed trees and composition operators in L2 spaces with non-densely defined powers
Abstract
It is shown that for every positive integer n there exists a subnormal weighted shift on a directed tree (with or without root) whose nth power is densely defined while its (n+1)th power is not. As a consequence, for every positive integer n there exists a non-symmetric subnormal composition operator C in an L2 space over a σ-finite measure space such that Cn is densely defined and Cn+1 is not.
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