Partially isometric Toeplitz operators on the polydisc

Abstract

A Toeplitz operator T, ∈ L∞(Tn), is a partial isometry if and only if there exist inner functions 1, 2 ∈ H∞(Dn) such that 1 and 2 depends on different variables and = 1 2. In particular, for n=1, along with new proof, this recovers a classical theorem of Brown and Douglas. We also prove that a partially isometric Toeplitz operator is hyponormal if and only if the corresponding symbol is an inner function in H∞(Dn). Moreover, partially isometric Toeplitz operators are always power partial isometry (following Halmos and Wallen), and hence, up to unitary equivalence, a partially isometric Toeplitz operator with symbol in L∞(Tn), n > 1, is either a shift, or a co-shift, or a direct sum of truncated shifts. Along the way, we prove that T is a shift whenever is inner in H∞(Dn).