On a Class of Ideals of the Toeplitz Algebra on the Bergman Space of the Unit Ball

Abstract

Let T denote the full Toeplitz algebra on the Bergman space of the unit ball Bn. For each subset G of L∞, let CI(G) denote the closed two-sided ideal of T generated by all TfTg-TgTf with f,g∈ G. It is known that CI(C(Bn))=K - the ideal of compact operators and CI(C(Bn))=T. Despite these ``extremal cases'', T does contain other non-trivial ideals. This paper gives a construction of a class of subsets G of L∞ so that K⊂neqCI(G)⊂neqT.