Toeplitz operators with quasi-radial quasi-homogeneous symbols and bundles of Lagrangian frames
Abstract
We prove that the quasi-homogenous symbols on the projective space Pn(C) yield commutative algebras of Toeplitz operators on all weighted Bergman spaces, thus extending to this compact case known results for the unit ball Bn. These algebras are Banach but not C*. We prove the existence of a strong link between such symbols and algebras with the geometry of Pn(C). The latter is also proved for the corresponding symbols and algebras on Bn.
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