A harmonic analysis approach to essential normality of principal submodules

Abstract

Guo and the second author have shown that the closure [I] in the Drury-Arveson space of a homogeneous principal ideal I in C[z1,...,zn] is essentially normal. In this note, the authors extend this result to the closure of any principal polynomial ideal in the Bergman space. In particular, the commutators and cross-commutators of the restrictions of the multiplication operators are shown to be in the Schatten p -class for p>n. The same is true for modules generated by polynomials with vector-valued coefficients. Further, the maximal ideal space XI of the resulting C-algebra for the quotient module is shown to be contained in Z(I) ∂Bn, where Z(I) is the zero variety for I, and to contain all points in ∂Bn that are limit points of Z(I) Bn. Finally, the techniques introduced enable one to study a certain class of weight Bergman spaces on the ball.