Determination of compactly supported functions in shift-invariant space by single-angle Radon samples

Abstract

While traditionally the computerized tomography of a function f∈ L2(R2) depends on the samples of its Radon transform at multiple angles, the real-time imaging sometimes requires the reconstruction of f by the samples of its Radon transform Rpf at a single angle θ, where p=(θ, θ) is the direction vector. This naturally leads to the question of identifying those functions that can be determined by their Radon samples at a single angle θ. The shift-invariant space V(, Z2) generated by is a type of function space that has been widely considered in many fields including wavelet analysis and signal processing. In this paper we examine the single-angle reconstruction problem for compactly supported functions f∈ V(, Z2). The central issue for the problem is to identify the eligible p and sampling set Xp⊂eq R such that f can be determined by its single-angle Radon (w.r.t p) samples at Xp. For the general generator , we address the eligible p for the two cases: (1) being nonvanishing (∫R2(x)dx≠0) and (2) being vanishing (∫R2(x)dx=0). We prove that eligible Xp exists for general . In particular, Xp can be explicitly constructed if ∈ C1(R2). The single-angle problem corresponding to the case that being positive definite is addressed such that Xp can be constructed easily.

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