Strichartz's conjecture for the spinor bundle over the real hyperbolic space
Abstract
Let Hn( R) denote the real hyperbolic space realized as the symmetric space Spin0(1,n)/Spin(n). In this paper, we provide a characterization for the image of the Poisson transform for L2-sections of the spinor bundle over the boundary ∂ Hn( R). As a consequence, we obtain an L2 uniform estimate for the generalized spectral projections associated to the spinor bundle over Hn( R), thereby extending Strichartz's conjecture from the scalar case to the spinor setting.
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