p-Summable Commutators in Dimension d

Abstract

We show that many invariant subspaces M for d-shifts (S1,...,Sd) of finite rank have the property that the projection P onto M almost commutes with the Sk in the sense that the commutators PSk - SkP belong to the Schatten-von Neumann class Lp for every p > d. In such cases the d-tuple of operators (T1,...,Td) obtained by compressing (S1,...,Sd) to the orthocomplement of M generates a *-algebra whose commutator ideal is contained in Lp, p > d. It follows that the C*-algebra generated by T1,...,Td is commutative modulo compact operators, the associated Dirac operator is Fredholm, and the index formula for the curvature invariant is stable under compact perturbations and homotopy for this restricted class of d-contractions. We conjecture that the latter conclusions persist under much more general circumstances.

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