Multiresolution analysis on spectra of hermitian matrices
Abstract
We establish a multiresolution analysis on the space Herm(n) of n× n complex Hermitian matrices which is adapted to invariance under conjugation by the unitary group U(n). The orbits under this action are parametrized by the possible ordered spectra of Hermitian matrices, which constitute a closed Weyl chamber of type An-1 in Rn. The space L2(Herm(n))U(n) of radial, i.e. U(n)-invariant L2-functions on Herm(n) is naturally identified with a certain weighted L2-space on this chamber. The scale spaces of our multiresolution analysis are obtained by usual dyadic dilations as well as generalized translations of a scaling function, where the generalized translation is a hypergroup translation which respects the radial geometry. We provide a concise criterion to characterize orthonormal wavelet bases and show that such bases always exist. They provide natural orthonormal bases of the space L2(Herm(n))U(n). Furthermore, we show how to obtain radial scaling functions from classical scaling functions on Rn. Finally, generalizations related to the Cartan decompositions for general compact Lie groups are indicated.
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