Equations. More Organized Proof of The Central Slice Theorem.

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Presentation transcript:

Equations

More Organized Proof of The Central Slice Theorem

The Central Slice Theorem Consider a 2-dimensional example of an emission imaging system. O(x,y) is the object function, describing the source distribution. The projection data, is the line integral along the projection direction. The Central Slice Theorem can be seen as a consequence of the separability of a 2-D Fourier Transform. The 1-D Fourier Transform of the projection is,

The Central Slice Theorem The one-dimensional Fourier transformation of a projection obtained at an angle J, is the same as the radical slice taken through the two-dimensional Fourier domain of the object at the same angle. Radon transform  2D FT 1D FT