Comments on “Generalised finite Radon transform for N × N images”
作者:
Highlights:
•
摘要
In Kingston and Svalbe [1], a generalized finite Radon transform (FRT) that applied to square arrays of arbitrary size N × N was defined and the Fourier slice theorem was established for the FRT. Kingston and Svalbe asserted that “the original definition by Matúš and Flusser was restricted to apply only to square arrays of prime size,” and “Hsung, Lun and Siu developed an FRT that also applied to dyadic square arrays,” and “Kingston further extended this to define an FRT that applies to prime-adic arrays”. It should be said that the presented generalized FRT together with the above FRT definitions repeated the known concept of tensor representation, or tensor transform of images of size N × N which was published earlier by Artyom Grigoryan in 1984–1991 in the USSR. The above mentioned “Fourier slice theorem” repeated the known tensor transform-based algorithm of 2-D DFT [5–11], which was developed for any order N1 × N2 of the transformation, including the cases of N × N, when N = 2r, (r > 1), and N = Lr, (r ≥ 1), where L is an odd prime. The problem of “over-representation” of the two-dimensional discrete Fourier transform in tensor representation was also solved by means of the paired representation in Grigoryan [6–9].
论文关键词:Radon transform,Fourier transform,Tensor representation of images,Paired transform
论文评审过程:Received 15 March 2010, Revised 28 January 2011, Accepted 19 June 2011, Available online 25 June 2011.
论文官网地址:https://doi.org/10.1016/j.imavis.2011.06.005