Real analytic expansion of spectral projections and extension of the Hecke-Bochner identity

In this article, we review the Weyl correspondence of bigraded spherical harmonics and use it to extend the Hecke-Bochner identities for the spectral projections f × φ _k ^n?1 for function f ∈ L ^p (? ⁿ ) with 1 ≤ p ≤ ∞. We prove that spheres are sets of injectivity for the twisted spherical means with real analytic weight. Then, we derive a real analytic expansion for the spectral projections f × φ _k ^n?1 for function f ∈ L ²(? ⁿ ). Using this expansion we deduce that a complex cone can be a set of injectivity for the twisted spherical means.