We prove the Paley-Wiener theorem for the spherical transform on the complex Grassmann manifolds $U/K=\mbox{SU}(p+q)/\mbox{S}(\mbox{U}_p\times \mbox{U}_q)$. This theorem characterizes the $K$-biinvariant smooth functions $f$ on the group $U$ that are supported in the $K$-invariant ball of radius $R$, with $R$ less than the injectivity radius of $U/K$, in terms of holomorphic extendability, exponential growth, and Weyl invariance properties of the spherical Fourier transforms $\hat{f}$, originally defined on the discrete set $\L_{sph}$ of highest restricted spherical weights.

The spherical Paley-Wiener theorem on the complex Grassmann manifolds SU(p+q)/S(U(p)times U(q)) / Camporesi, Roberto. - In: PROCEEDINGS OF THE AMERICAN MATHEMATICAL SOCIETY. - ISSN 0002-9939. - STAMPA. - 134:9(2006), pp. 2649-2659.

The spherical Paley-Wiener theorem on the complex Grassmann manifolds SU(p+q)/S(U(p)times U(q))

CAMPORESI, ROBERTO
2006

Abstract

We prove the Paley-Wiener theorem for the spherical transform on the complex Grassmann manifolds $U/K=\mbox{SU}(p+q)/\mbox{S}(\mbox{U}_p\times \mbox{U}_q)$. This theorem characterizes the $K$-biinvariant smooth functions $f$ on the group $U$ that are supported in the $K$-invariant ball of radius $R$, with $R$ less than the injectivity radius of $U/K$, in terms of holomorphic extendability, exponential growth, and Weyl invariance properties of the spherical Fourier transforms $\hat{f}$, originally defined on the discrete set $\L_{sph}$ of highest restricted spherical weights.
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Utilizza questo identificativo per citare o creare un link a questo documento: https://hdl.handle.net/11583/1398372
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