Document Type
Article
Publication Date
9-1-2022
Abstract
We study higher-rank Radon transforms of the form f(τ) → ∫ τ⊂ζf(τ) , where τ is a j-dimensional totally geodesic submanifold in the n-dimensional real constant curvature space and ζ is a similar submanifold of dimension k> j. The corresponding dual transforms are also considered. The transforms are explored in the Euclidean case (affine Grassmannian bundles), the elliptic case (compact Grassmannians), and the hyperbolic case (the hyperboloid model, the Beltrami-Klein model, and the projective model). The main objectives are sharp conditions for the existence and injectivity of the Radon transforms in Lebesgue spaces, transition from one model to another, support theorems, and inversion formulas. Conjectures and open problems are discussed.
Publication Source (Journal or Book title)
Journal of Mathematical Sciences United States
First Page
148
Last Page
195
Recommended Citation
Rubin, B. (2022). HIGHER-RANK RADON TRANSFORMS ON CONSTANT CURVATURE SPACES. Journal of Mathematical Sciences United States, 266 (1), 148-195. https://doi.org/10.1007/s10958-022-05877-x