The Radon Transform in multiple dimensions

The Radon transform in 2D means an integral taken along a parametrized 2D linear set (normally a straight line). In multiple dimensions a linear geometrical set can mean a line or a hyperplane, the latter leads us to the multi-D generalization of our previous definition of the Radon-transform, the former gives the Ray (or X-ray) transform.

Radon transform in multiple dimensions

Let us take the paramters $$ \left(t,\boldsymbol{\omega} \right )$ to describe a hyperplane ( $$\mathbf{H}_{\boldsymbol{\omega},t}\left ( \mathbf{s},\boldsymbol{\Omega_{\perp} } \right )$ ), where according to the its y points the integrals are taken, $$\mathbf{x}\in \mathbb{R}^{n},\mathbf{y}\in \mathbb{R}^{n-1},\in \mathbf{H}_{\boldsymbol{\omega},t}\left ( \mathbf{s},\boldsymbol{\Omega_{\perp} } \right ), t\in \mathbb{R} , \boldsymbol{\omega}\in \mathbb{S}^{n-1}$ ), with that we have the definition of the Radon transform for an n dimensional function:
$$ \mathfrak{R}f\left ( t,\boldsymbol{\omega} \right )=\int_{-\infty }^{\infty }\int_{-\infty }^{\infty } { f\left ( \mathbf{x} \right )\delta \left ( t-\boldsymbol{\omega} \mathbf{x} \right )}d\mathbf{x}= \int_{-\infty }^{\infty } { f\left ( t\boldsymbol{\omega}+ \mathbf{y} \right )}d\mathbf{y}$

Ray-transform

If carry out the integral with regards to t, i.e. instead of a hyperplane we have a direction $$ \boldsymbol{\omega}$ and along that we do a line integration, we obtain the other possible generalization of the 2D Radon transform, called the (X-)Ray transform. With the definitions above the $$ \mathfrak{P}$ Ray transform is defined as:
$$ \mathfrak{P}f\left ( \mathbf{x},\boldsymbol{\omega} \right )= \int_{-\infty }^{\infty } { f\left ( t\boldsymbol{\omega}+ \mathbf{x} \right )}dt$

where it is enough to take the values of x from a plane perpendicular to vector $$ \boldsymbol{\omega}$ .

With these definitions we can construct the inverse of the Radon and the Ray transforms.

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Medical Imaging

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The Radon Transform in multiple dimensions

Radon transform in multiple dimensions

Ray-transform

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Medical Imaging

Site Language: English