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A Toeplitz-like operator with rational symbol having poles on the unit circle III: the adjoint

This paper contains a further analysis of the Toeplitz-like operators $T_ω$ on $H^p$ with rational symbol $ω$ having poles on the unit circle that were previously studied in [5.6]. Here the adjoint operator $T_ω^*$ is described. In the case where $p=2$ and $ω$ has poles only on the unit circle $\mathbb{T}$, a description is given for when $T_ω^*$ is symmetric and when $T_ω^*$ admits a selfadjoint extension. Also in the case where $p=2$, $ω$ has only poles on $\mathbb{T}$ and in addition $ω$ is proper, it is shown that $T_ω^*$ coincides with the unbounded Toeplitz operator defined by Sarason in [10].