Radon transform: Difference between revisions
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[[File:Radon transform.png|thumb|Radon transform. Maps ''f'' on the (''x,{{nbsp}}y'')-domain to ''Rf'' on the (''α,{{nbsp}}s'')-domain.]] |
[[File:Radon transform.png|thumb|Radon transform. Maps ''f'' on the (''x,{{nbsp}}y'')-domain to ''Rf'' on the (''α,{{nbsp}}s'')-domain.]] |
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[[File:Sinogram - Two Square Indicator Phantom.svg|thumb|right|Radon transform of the [[indicator function]] of two squares shown in the image below. Lighter regions indicate larger function values. Black indicates zero.]] |
[[File:Sinogram - Two Square Indicator Phantom.svg|thumb|right|Radon transform of the [[indicator function]] of two squares shown in the image below. Lighter regions indicate larger function values. Black indicates zero.]] |
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[[File:Sinogram Source - Two Squares Phantom. |
[[File:Sinogram Source - Two Squares Phantom.svg|thumb|right|Original function is equal to one on the white region and zero on the dark region.]] |
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In [[mathematics]], the '''Radon transform''' is the [[integral transform]] which takes a function ''f'' defined on the plane to a function ''Rf'' defined on the (two-dimensional) space of lines in the plane, whose value at a particular line is equal to the [[line integral]] of the function over that line. The transform was introduced in 1917 by [[Johann Radon]],{{sfn|Radon|1917}} who also provided a formula for the inverse transform. Radon further included formulas for the transform in [[three dimensions]], in which the integral is taken over planes (integrating over lines is known as the [[X-ray transform]]). It was later generalized to higher-dimensional [[Euclidean space]]s, and more broadly in the context of [[integral geometry]]. The [[complex number|complex]] analogue of the Radon transform is known as the [[Penrose transform]]. The Radon transform is widely applicable to [[tomography]], the creation of an image from the projection data associated with cross-sectional scans of an object. |
In [[mathematics]], the '''Radon transform''' is the [[integral transform]] which takes a function ''f'' defined on the plane to a function ''Rf'' defined on the (two-dimensional) space of lines in the plane, whose value at a particular line is equal to the [[line integral]] of the function over that line. The transform was introduced in 1917 by [[Johann Radon]],{{sfn|Radon|1917}} who also provided a formula for the inverse transform. Radon further included formulas for the transform in [[three dimensions]], in which the integral is taken over planes (integrating over lines is known as the [[X-ray transform]]). It was later generalized to higher-dimensional [[Euclidean space]]s, and more broadly in the context of [[integral geometry]]. The [[complex number|complex]] analogue of the Radon transform is known as the [[Penrose transform]]. The Radon transform is widely applicable to [[tomography]], the creation of an image from the projection data associated with cross-sectional scans of an object. |
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Revision as of 18:29, 2 August 2020
In mathematics, the Radon transform is the integral transform which takes a function f defined on the plane to a function Rf defined on the (two-dimensional) space of lines in the plane, whose value at a particular line is equal to the line integral of the function over that line. The transform was introduced in 1917 by Johann Radon,[1] who also provided a formula for the inverse transform. Radon further included formulas for the transform in three dimensions, in which the integral is taken over planes (integrating over lines is known as the X-ray transform). It was later generalized to higher-dimensional Euclidean spaces, and more broadly in the context of integral geometry. The complex analogue of the Radon transform is known as the Penrose transform. The Radon transform is widely applicable to tomography, the creation of an image from the projection data associated with cross-sectional scans of an object.
Explanation
If a function represents an unknown density, then the Radon transform represents the projection data obtained as the output of a tomographic scan. Hence the inverse of the Radon transform can be used to reconstruct the original density from the projection data, and thus it forms the mathematical underpinning for tomographic reconstruction, also known as iterative reconstruction.
The Radon transform data is often called a sinogram because the Radon transform of an off-center point source is a sinusoid. Consequently, the Radon transform of a number of small objects appears graphically as a number of blurred sine waves with different amplitudes and phases.
The Radon transform is useful in computed axial tomography (CAT scan), barcode scanners, electron microscopy of macromolecular assemblies like viruses and protein complexes, reflection seismology and in the solution of hyperbolic partial differential equations.
Definition
Let ƒ(x) = ƒ(x,y) be a function that satisfies the three regularity conditions:[2]
- ƒ(x,y) is continuous
- the double integral , extending over the whole plane, converges
- for any arbitrary point on the plane it holds that
The Radon transform, Rƒ, is a function defined on the space of straight lines L in R2 by the line integral along each such line as
Concretely, the parametrization of any straight line L with respect to arc length z can always be written
where s is the distance of L from the origin and is the angle the normal vector to L makes with the x axis. It follows that the quantities (α,s) can be considered as coordinates on the space of all lines in R2, and the Radon transform can be expressed in these coordinates by
More generally, in the n-dimensional Euclidean space Rn, the Radon transform of a function ƒ satisfying the regularity conditions is a function Rƒ on the space Σn of all hyperplanes in Rn. It is defined by
for ξ ∈Σn, where the integral is taken with respect to the natural hypersurface measure, dσ (generalizing the |dx| term from the 2-dimensional case). Observe that any element of Σn is characterized as the solution locus of an equation
where α ∈ Sn−1 is a unit vector and s ∈ R. Thus the n-dimensional Radon transform may be rewritten as a function on Sn−1×R via
It is also possible to generalize the Radon transform still further by integrating instead over k-dimensional affine subspaces of Rn. The X-ray transform is the most widely used special case of this construction, and is obtained by integrating over straight lines.
Relationship with the Fourier transform
The Radon transform is closely related to the Fourier transform. We define the univariate Fourier transform here as
and for a function of a 2-vector ,
For convenience, denote . The Fourier slice theorem then states
where
Thus the two-dimensional Fourier transform of the initial function along a line at the inclination angle is the one variable Fourier transform of the Radon transform (acquired at angle ) of that function. This fact can be used to compute both the Radon transform and its inverse.
The result can be generalized into n dimensions
Dual transform
The dual Radon transform is a kind of adjoint to the Radon transform. Beginning with a function g on the space Σn, the dual Radon transform is the function on Rn defined by
The integral here is taken over the set of all hyperplanes incident with the point x ∈ Rn, and the measure dμ is the unique probability measure on the set invariant under rotations about the point x.
Concretely, for the two-dimensional Radon transform, the dual transform is given by
In the context of image processing, the dual transform is commonly called backprojection[3] as it takes a function defined on each line in the plane and 'smears' or projects it back over the line to produce an image.
Intertwining property
Let Δ denote the Laplacian on Rn:
This is a natural rotationally invariant second-order differential operator. On Σn, the "radial" second derivative
is also rotationally invariant. The Radon transform and its dual are intertwining operators for these two differential operators in the sense that[4]
In analyzing the solutions to the wave equation in multiple spatial dimensions, the intertwining property leads to the translational representation of Lax and Philips.[5] In imaging[6] and numerical analysis[7] this is exploited to reduce multi-dimensional problems into single-dimensional ones, as a dimensional splitting method.
Reconstruction approaches
The process of reconstruction produces the image (or function in the previous section) from its projection data. Reconstruction is an inverse problem.
Radon inversion formula
In the 2D case, the most commonly used analytical formula to recover from its Radon transform is the Filtered Backprojection Formula or Radon Inversion Formula:
where is such that .[9]
The convolution kernel is referred to as Ramp filter in some literature.
Ill-posedness
Intuitively, in the filtered backprojection formula, by analogy with differentiation, for which , we see that the filter performs an operation similar to a derivative. Roughly speaking, then, the filter makes objects more singular.
A quantitive statement of the ill-posedness of Radon Inversion goes as follows:
We have
where is the previously defined adjoint to the Radon Transform.
Thus for ,
- .
The complex exponential is thus an eigenfunction of with eigenvalue . Thus the singular values of are . Since these singular values tend to 0, is unbounded.[9]
Iterative reconstruction methods
Compared with the Filtered Backprojection method, iterative reconstruction costs large computation time, limiting its practical use. However, due to the ill-posedness of Radon Inversion, the Filtered Backprojection method may be infeasible in the presence of discontinuity or noise. Iterative reconstruction methods (e.g., iterative Sparse Asymptotic Minimum Variance[10]) could provide metal artifact reduction, noise and dose reduction for the reconstructed result that attract much research interest around the world.
Inversion formulas
Explicit and computationally efficient inversion formulas for the Radon transform and its dual are available. The Radon transform in n dimensions can be inverted by the formula[11]
where
and the power of the Laplacian (−Δ)(n−1)/2 is defined as a pseudodifferential operator if necessary by the Fourier transform
For computational purposes, the power of the Laplacian is commuted with the dual transform R* to give[12]
where Hs is the Hilbert transform with respect to the s variable. In two dimensions, the operator Hsd/ds appears in image processing as a ramp filter.[13] One can prove directly from the Fourier slice theorem and change of variables for integration that for a compactly supported continuous function ƒ of two variables
Thus in an image processing context the original image ƒ can be recovered from the 'sinogram' data Rƒ by applying a ramp filter (in the variable) and then back-projecting. As the filtering step can be performed efficiently (for example using digital signal processing techniques) and the back projection step is simply an accumulation of values in the pixels of the image, this results in a highly efficient, and hence widely used, algorithm.
Explicitly, the inversion formula obtained by the latter method is[3]
if n is odd, and
if n is even.
The dual transform can also be inverted by an analogous formula:
Radon transform in algebraic geometry
In algebraic geometry, a Radon transform (also known as the Brylinski–Radon transform) is constructed as follows.
Write
for the universal hyperplane, i.e., H consists of pairs (x, h) where x is a point in d-dimensional projective space and h is a point in the dual projective space (in other words, x is a line through the origin in (d+1)-dimensional affine space, and h is a hyperplane in that space) such that x is contained in h.
Then the Brylinksi–Radon transform is the functor between appropriate derived categories of étale sheaves
The main theorem about this transform is that this transform induces an equivalence of the categories of perverse sheaves on the projective space and its dual projective space, up to constant sheaves.[14]
See also
- Periodogram
- Matched filter
- Deconvolution
- X-ray transform
- Funk transform
- The Hough transform, when written in a continuous form, is very similar, if not equivalent, to the Radon transform.[15]
- Cauchy-Crofton theorem is a closely related formula for computing the length of curves in space.
- Fast Fourier transform
Notes
- ^ Radon 1917.
- ^ Radon, J. (December 1986). "On the determination of functions from their integral values along certain manifolds". IEEE Transactions on Medical Imaging. 5 (4): 170–176. doi:10.1109/TMI.1986.4307775. PMID 18244009.
- ^ a b Roerdink 2001.
- ^ Helgason 1984, Lemma I.2.1.
- ^ Lax, P. D.; Philips, R. S. (1964). "Scattering theory". Bull. Amer. Math. Soc. 70 (1): 130–142. doi:10.1090/s0002-9904-1964-11051-x.
- ^ Bonneel, N.; Rabin, J.; Peyre, G.; Pfister, H. (2015). "Sliced and Radon Wasserstein Barycenters of Measures". Journal of Mathematical Imaging and Vision. 51 (1): 22–25. doi:10.1007/s10851-014-0506-3.
- ^ Rim, D. (2018). "Dimensional Splitting of Hyperbolic Partial Differential Equations Using the Radon Transform". SIAM J. Sci. Comput. 40 (6): A4184–A4207. arXiv:1705.03609. doi:10.1137/17m1135633.
- ^ Candès 2016a.
- ^ a b Candès 2016b.
- ^ Abeida, Habti; Zhang, Qilin; Li, Jian; Merabtine, Nadjim (2013). "Iterative Sparse Asymptotic Minimum Variance Based Approaches for Array Processing" (PDF). IEEE Transactions on Signal Processing. 61 (4). IEEE: 933–944. arXiv:1802.03070. Bibcode:2013ITSP...61..933A. doi:10.1109/tsp.2012.2231676. ISSN 1053-587X.
- ^ Helgason 1984, Theorem I.2.13.
- ^ Helgason 1984, Theorem I.2.16.
- ^ Nygren 1997.
- ^ Kiehl & Weissauer (2001, Ch. IV, Cor. 2.4)
- ^ van Ginkel, Hendricks & van Vliet 2004.
References
- Radon, Johann (1917), "Über die Bestimmung von Funktionen durch ihre Integralwerte längs gewisser Mannigfaltigkeiten", Berichte über die Verhandlungen der Königlich-Sächsischen Akademie der Wissenschaften zu Leipzig, Mathematisch-Physische Klasse [Reports on the proceedings of the Royal Saxonian Academy of Sciences at Leipzig, mathematical and physical section] (69), Leipzig: Teubner: 262–277; Translation: Radon, J.; Parks, P.C. (translator) (1986), "On the determination of functions from their integral values along certain manifolds", IEEE Transactions on Medical Imaging, 5 (4): 170–176, doi:10.1109/TMI.1986.4307775, PMID 18244009
{{citation}}
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has generic name (help). - Roerdink, J.B.T.M. (2001) [1994], "Tomography", Encyclopedia of Mathematics, EMS Press.
- Helgason, Sigurdur (1984), Groups and Geometric Analysis: Integral Geometry, Invariant Differential Operators, and Spherical Functions, Academic Press, ISBN 0-12-338301-3.
- Candès, Emmanuel (February 2, 2016a). "Applied Fourier Analysis and Elements of Modern Signal Processing - Lecture 9" (PDF).
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(help) - Candès, Emmanuel (February 4, 2016b). "Applied Fourier Analysis and Elements of Modern Signal Processing - Lecture 10" (PDF).
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(help) - Nygren, Anders J. (1997). "Filtered Back Projection". Tomographic Reconstruction of SPECT Data.
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(help) - van Ginkel, M.; Hendricks, C.L. Luengo; van Vliet, L.J. (2004). "A short introduction to the Radon and Hough transforms and how they relate to each other" (PDF). Archived (PDF) from the original on 2016-07-29.
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Further reading
- Lokenath Debnath; Dambaru Bhatta (19 April 2016). Integral Transforms and Their Applications. CRC Press. ISBN 978-1-4200-1091-6.
- Deans, Stanley R. (1983), The Radon Transform and Some of Its Applications, New York: John Wiley & Sons
- Helgason, Sigurdur (2008), Geometric analysis on symmetric spaces, Mathematical Surveys and Monographs, vol. 39 (2nd ed.), Providence, R.I.: American Mathematical Society, doi:10.1090/surv/039, ISBN 978-0-8218-4530-1, MR 2463854
- Herman, Gabor T. (2009), Fundamentals of Computerized Tomography: Image Reconstruction from Projections (2nd ed.), Springer, ISBN 978-1-85233-617-2
- Minlos, R.A. (2001) [1994], "Radon transform", Encyclopedia of Mathematics, EMS Press
- Natterer, Frank (June 2001), The Mathematics of Computerized Tomography, Classics in Applied Mathematics, vol. 32, Society for Industrial and Applied Mathematics, ISBN 0-89871-493-1
- Natterer, Frank; Wübbeling, Frank (2001), Mathematical Methods in Image Reconstruction, Society for Industrial and Applied Mathematics, ISBN 0-89871-472-9
- Kiehl, Reinhardt; Weissauer, Rainer (2001), Weil conjectures, perverse sheaves and l'adic Fourier transform, Springer, doi:10.1007/978-3-662-04576-3, ISBN 3-540-41457-6, MR 1855066
External links
- Weisstein, Eric W. "Radon transform". MathWorld.
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ignored (help) - Analytical projection (the Radon transform) (video). Part of the "Computed Tomography and the ASTRA Toolbox" course. University of Antwerp. September 10, 2015.