Brown-Halmos type Theorems on the proper images of bounded symmetric domains

Abstract

Let ⊂eq Cn be a bounded symmetric domain and f : ⊂eq Cn be a proper holomorphic mapping which is factored by a finite complex reflection group G. We identify a family of reproducing kernel Hilbert spaces on arising naturally from the isotypic decomposition of the regular representation of G on the Hardy space H2(). Each element of this family can be realized as a closed subspace of some L2-space on the Silov boundary of . The reproducing kernel Hilbert space associated to the sign representation of G is the Hardy space H2(). We establish a Brown-Halmos type characterization for the Toeplitz operators on H2(), where is the image of the open unit polydisc Dn in Cn under a proper holomorphic mapping factored by the finite complex reflection group G(m,p,n). Moreover, we prove various multiplicative properties of Toeplitz operators on H2(), where is a proper holomorphic image of a bounded symmetric domain.

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