Fredholm operators in the Toeplitz Algebra I(QC)

Abstract

We will give a complete description of I, the set of invertible quasicontinuous functions on the unit circle. After doing this, we will then classify the path-connected components of I and show that I has uncountably many path-connected components. We will then use the above classifications to characterize F, the set of Fredholm operators of the C*-algebra generated by the Toeplitz operators Tφ with quasicontinuous symbols φ. Then we will classify the path-connected components of F and show that F also has uncountably many path-connected components.