Let FA(Cn) denote the Fock space associated with a real linear transformation A on Cn which is symmetric and positive definite relative to the real inner product Re〈z,w〉, z,w∈Cn. Let BA denote the Bargmann transform, mapping L2(Rn) unitarily onto FA(Cn). In this note, we show that one can find a group G, whose unitary irreducible representation at its base vector coincides with BA*Kw up to a constant multiple, where BA* denotes the adjoint of BA and Kw denotes the reproducing kernel of FA(Cn). © 2010 Elsevier Masson SAS.

Venku Naidu .D

Department of Mathematics

R. Radha

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Journal	Bulletin des Sciences Mathematiques
ISSN	00074497