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Interpolation by bivariate polynomials based on Radon projections

B. Bojanov; I. K. Georgieva — 2004

Studia Mathematica

For any given set of angles θ₀ < ... < θₙ in [0,π), we show that a set of $(\binom{n + 2}{2})$ Radon projections, consisting of k parallel X-ray beams in each direction $θ_{k}$ , k = 0, ..., n, determines uniquely algebraic polynomials of degree n in two variables.

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