Toeplitz operators on the domain \Z∈ M2×2(C) Z Z* < I\ with U(2)×T2-invariant symbols

Abstract

Let D be the irreducible bounded symmetric domain of 2×2 complex matrices that satisfy ZZ* < I2. The biholomorphism group of D is realized by U(2,2) with isotropy at the origin given by U(2)×U(2). Denote by T2 the subgroup of diagonal matrices in U(2). We prove that the set of U(2)×T2-invariant essentially bounded symbols yield Toeplitz operators that generate commutative C*-algebras on all weighted Bergman spaces over D. Using tools from representation theory, we also provide an integral formula for the spectra of these Toeplitz operators.