Notes on the codimension one conjecture in the operator corona theorem

Abstract

Answering on the question of S.R.Treil [23], for every δ, 0<δ<1, examples of contractions are constructed such that their characteristic functions F∈ H∞( E E) satisfy the conditions \|F(z)x\|≥δ\|x\| \ and \ E F(z) E =1 \ for every \ z∈ D, \ \ x∈ E, but F are not left invertible. Also, it is shown that the condition z∈ D\|I-F(z) F(z)\| S1<∞, where S1 is the trace class of operators, which is sufficient for the left invertibility of the operator-valued function F satisfying the estimate \|F(z)x\|≥δ\|x\| for every z∈ D, x∈ E, with some δ>0 (S.R.Treil, [22]), is necessary for the left invertibility of an inner function F such that E F(z) E<∞ for some z∈ D.