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

Abstract

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