Asymptotic expantion of covariant symbol on the complex unit sphere
Abstract
Starting from a complete family (not defined by the reproducing kernel) for the unit sphere Sn in the complex n-space Cn, we obtain an asymptotic expansion for the associated Berezin transform. The proof involves the computation of the asymptotic behaviour of functions in the complete family. Furthermore, we prove an Egorov-type theorem for the covariant symbol related to a pseudo-differential operator on L2( Sn).
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