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Computed Tomography (Part 1)
Yao Wang Tandon School of Engineering
New York University, Brooklyn, NY 11201
Based on Prince and Links, Medical Imaging Signals and Systems and Lecture Notes by Prince. Figures are from the book.
EL-GY 6813 / BE-GY 6203 / G16.4426 Medical Imaging
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F16 Yao Wang @ NYU
Lecture Outline • Instrumentation
– CT Generations – X-ray source and collimation – CT detectors
• Image Formation – Line integrals – Parallel Ray Reconstruction
• Radon transform • Back projection • Filtered backprojection • Convolution backprojection • Implementation issues
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Limitation of Projection Radiography • Projection radiography
– Projection of a 2D slice along one direction only – Can only see the “shadow” of the 3D body
• CT: generating many 1D projections in different angles – When the angle spacing is sufficiently small, can reconstruct the
2D slice very well
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1st Generation CT: Parallel Projections
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2nd Generation
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3G: Fan Beam
Much faster than 2G
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4G
Fast Cannot use collimator at detector, hence affected by scattering
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5G: Electron Beam CT (EBCT)
Stationary source and detector. Used for fast (cine) whole heart imaging Source of x-ray moves around by steering an electron beam around X-ray tube anode.
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6G: Helical CT
Entire abdomen or chest can be completed in 30 sec.
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7G: Multislice
From http://www.kau.edu.sa/Files/0008512/Files/19500_2nd_presentation_final.pdf
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F16 Yao Wang @ NYU
Reduced scan time and increased Z-resolution (thin slices) Most modern MSCT systems generates 64 slices per rotation, can image whole body (1.5 m) in 30 sec.
From http://www.kau.edu.sa/Files/0008512/Files/19500_2nd_presentation_final.pdf
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Generation Source Source Collimation Detector
1st Single X-ray Tube Pencil Beam Single
2nd Single X-ray Tube Fan Beam (not enough to cover FOV) Multiple
3rd Single X-ray Tube Fan Beam (enough to cover FOV) Many
4th Single X-ray Tube Fan Beam covers FOV
StationaryRing of
Detectors
5th
Many tungstenanodes in single
large tube Fan Beam
StationaryRing of
Detectors
6th 3G/4G 3G/4G 3G/4G
7th Single X-ray Tube Cone Beam
Multiplearray ofdetectors
From http://www.kau.edu.sa/Files/0008512/Files/19500_2nd_presentation_final.pdf
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From http://www.kau.edu.sa/Files/0008512/Files/19500_2nd_presentation_final.pdf
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F16 Yao Wang @ NYU
X-ray Source
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Dual Energy CT • Recall that linear attenuation coefficient depends on the
X-ray energy • Dual energy CT enables simultanious acquisition to two
images of the organ, reflecting their attenuation profiles corresponding to different energies
• The scanner has two x-ray tubes using two different voltage levels to generate the x-rays.
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X-ray Detectors
Convert detected photons to lights
Convert light to electric current
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CT Measurement Model
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I_0 must be calibrated for each detector, measured in the absence of attenuating objects
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CT Number
Need 12 bits to represent, h=-1000 for air.. Godfrey Hounsfield, together with Alan Cormack, invented X-ray CT!
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CT numbers of Different Tissues at 70KeV [Smith&Webb]
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Parameterization of a Line
s
x
θ
Option 1 (parameterized by s):
Option 2:
Each projection line is defined by (l,θ) A point on this line (x,y) can be specified with two options
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Line Integral: parametric form
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Line Integral: set form
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Physical meaning of “f” & “g”
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What is g(l,q)?
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Example • Example 1: Consider an image slice which contains a
single square in the center. What is its projections along 0, 45, 90, 135 degrees?
• Example 2: Instead of a square, we have a rectangle. Repeat.
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Sinogram
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Bottom row: θ=0 (vertical proj), middle θ=π/2 (horizontal proj), top θ=π-Δθ
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F16 Yao Wang @ NYU
Backprojection • The simplest method for reconstructing an image from a
projection along an angle is by backprojection – Assigning every point in the image along the line defined by (l,q) the
projected value g(l, q), repeat for all l for the given q
s
x
y
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Example • Continue with the example of the image with a square in
the center. Determine the backprojected image from each projection and the reconstruction by summing different number of backprojections
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Two Ways of Performing Backprojection • Option 1: assigning value of g(l, θ) to all points on the line (l, θ)
– g(l, θ) is only measured at certain l: ln=n Δl – If l is coarsely sampled (Δl is large), many points in an image will not be
assigned a value – Many points on the line may not be a sample point in a digital image
• Option 2: For each θ, go through all sampling points (x,y) in an image, find its corresponding “l=x cos θ+y sin θ”, take the g value for (l, θ)
– g(l, θ) is only measured at certain l: ln=n Δl – must interpolate g(l, θ) for any l from given g(ln, θ)
• Option 2 is better, as it makes sure all sample points in an image are assigned a value
• For more accurate results, the backprojected value at each point should be divided by the length of the underlying image in the projection direction (if known)
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Backprojection Summation
Replaced by a sum in practice
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Implementation Issues
From L. Parra at CUNY, http://bme.ccny.cuny.edu/faculty/parra/teaching/med-imaging/lecture4.pdf 33
g(:,phi) stores the projection data at angle phi corresponding to excentricities stored in s_n
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F16 Yao Wang @ NYU
Implementation: Projection • To create projection data using computers will have similar problems.
Possible l and q are both quantized. If you first specify (l,q), then find (x,y) that are on this line. It is not easy. Instead, for given q, you can go through all (x,y) and determine corresponding l, quantize l to one of those you want to collect data.
• Sample matlab code (for illustration purpose only) – f(x,y) stores the original image data – G(l,phi) stores projection data, ql is the desired quantization stepsize for l.
N=ceil(sqrt(I*I+J*J))+1; %(assume image size IxJ), N0 is maximum lateral distance N0= floor((N-1)/2); ql=1; G=zeros(N,180); for phi=0:179
for (x=-J/2:J/2-1; y=-I/2:I/2-1) l=x*cos(phi*pi/180)+y*sin(phi*pi/180);
l=round(l/ql)+N0+1; If (l>=1) && (l<=N)
G(l,phi+1)=G(l,phi+1)+f(x+J/2+1,y+I/2+1); End end
end
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Problems with Backprojection à Blurring
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Projection Slice Theorem
The Fourier Transform of a projection at angle θ is a line in the Fourier transform of the image at the same angle. If (l, θ) are sampled sufficiently dense, then from g (l, θ) we essentially know F(u,v) (on the polar coordinate), and by inverse transform we can obtain f(x,y)!
dlljlgG }2exp{),(),( πρθθρ −= ∫∞
∞−
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Illustration of the Projection Slice Theorem
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Proof • Go through on the board • Using the set form of the line integral • See Prince&Links, P. 198
dlljlgG }2exp{),(),( πρθθρ −= ∫∞
∞−
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F16 Yao Wang @ NYU
The Fourier Method • The projection slice theorem leads to the following
conceptually simple reconstruction method – Take 1D FT of each projection g(l, θ) to obtain G(ρ, θ) for all θ – Convert G(ρ, θ) to Cartesian grid F(u,v) – Take inverse 2D FT to obtain f(x,y)
• Not used because – Difficult to interpolate polar data onto a Cartesian grid – Inverse 2D FT is time consuming
• But is important for conceptual understanding – Take inverse 2D FT on G(ρ, θ) on the polar coordinate leads to
the widely used Filtered Backprojection algorithm
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F16 Yao Wang @ NYU
Filtered Backprojection • Inverse 2D FT in Cartesian coordinate:
• Inverse 2D FT in Polar coordinate:
• Proof of filtered backprojection algorithm
Inverse FT
∫ ∫ += dudvevuFyxf yvxuj )(2),(),( π
∫ ∫>− ∞>−
+=π
θθπρ θρρθρθρ20 0
)sincos(2)sin,cos(),( ddeFyxf yxj
=l =G(r,q)
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F16 Yao Wang @ NYU
Filtered Backprojection Algorithm • Algorithm:
– For each θ • Take 1D FT of g(l, θ) for each θ -> G(ρ,θ) • Frequency domain filtering: G(ρ, θ) -> Q(r, θ)=|ρ|G(r, θ) • Take inverse 1D FT: Q(ρ, θ) -> q(l, θ) • Backprojecting q(l,θ) to image domain -> bq(x,y)
– Sum of backprojected images for all θ
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Function of the Ramp Filter • Filter response:
– c(ρ) =|ρ| – High pass filter
• G(ρ, θ) is more densely sampled when ρ is small, and vice verse
• The ramp filter compensate for the sparser sampling at higher ρ
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Convolution Backprojection • The Filtered backprojection method requires taking 2 Fourier
transforms (forward and inverse) for each projection • Instead of performing filtering in the FT domain, perform convolution
in the spatial domain • Assuming c(l) is the spatial domain filter
– |ρ| <-> c(l) – |ρ|G(ρ, θ) <-> c(l) * g(l, θ)
• For each ρ: – Convolve projection g(l, θ) with c(l): q(l, θ)= g(l, θ) * c(l) – Backprojecting q(l, θ) to image domain -> bθ(x,y) – Add bθ(x,y) to the backprojection sum
• Much faster if c(l) is short – Used in most commercial CT scanners
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Step 1: Convolution
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Step 2: Backprojection
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Step 3: Summation
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Ramp Filter Design
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The Ram-Lak Filter (from [Kak&Slaney])
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Common Filters • Ram-Lak: using the rectangular window • Shepp-Logan: using a sinc window • Cosine: using a cosine window • Hamming: using a generalized Hamming window • See Fig. B.5 in A. Webb, Introduction to biomedical
imaging
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Practical Implementation • Projections g(l, θ) are only measured at finite intervals
– l=nτ; – t chosen based on maximum frequency in G(ρ, θ), W
• 1/τ >=2W or τ <=1/2W (Nyquist Sampling Theorem)
• W can be estimated by the number of cycles/cm in the projection direction in the most detailed area in the slice to be scanned
• For filtered backprojection: – Fourier transform G(ρ, θ) is obtained via FFT using samples g(nτ, θ) – If N sample are available in g, 2N point FFT is taken by zero padding g(nτ, θ)
• For convolution backprojection – The ramp-filter is sampled at l=nτ – Sampled Ram-Lak Filter
( )⎪⎩
⎪⎨
⎧
==−=
=evennoddnn
nnc
;0;/1
0;4/1)( 2
2
πττ
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F16 Yao Wang @ NYU
Matlab Implementation • MATLAB (image toolbox) has several built-in functions:
– phantom: create phantom images of size NxN I = PHANTOM(DEF,N) DEF=‘Shepp-Logan’,’Modified Shepp-Logan’
Can also construct your own phantom, or use an arbitrary image, use imread( )
– radon: generate projection data from a phantom • Can specify sampling of q R = RADON(I,THETA)
The number of samples per projection angle = sqrt(2) N
– iradon: reconstruct an image from measured projections • Uses the filtered backprojection method • Can choose different filters and different interpolation methods for
performing backprojection [I,H]=IRADON(R,THETA,INTERPOLATION,FILTER,FREQUENCY_SCALING,OUTPUT_SIZE)
Interpoltation filters: used for backprojection – 'nearest' - nearest neighbor interpolation, – 'linear' - linear interpolation (default), – 'spline' - spline interpolation • Reconstruction filter: ‘Ram-Lak’ (default), 'Shepp-Logan’, 'Cosine’
– Use ‘help radon’ etc. to learn the specifics – Other useful command:
• imshow, imagesc, colormap 52
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Summary • Different generations of CT machines:
– Difference and pros and cons of each • X-ray source and detector design
– Require (close-to) monogenic x-ray source • Relation between detector reading and absorption properties of the
imaged slice – Line integral of absorption coefficients (Radon transform)
• Reconstruction methods – Backprojection summation – Fourier method (projection slice theorem) – Filtered backprojection – Convolution backprojection
• Impact of number of projection angles on reconstruction image quality
• Matlab implementations
Equivalent, but differ in computation
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F16 Yao Wang @ NYU
Reference • Prince and Links, Medical Imaging Signals and Systems,
Chap 6. • Webb, Introduction to biomedical imaging, Appendix B. • Kak and Slanley, Principles of Computerized
Tomographic Imaging, IEEE Press, 1988. Chap. 3 – Electronic copy available at
http://www.slaney.org/pct/pct-toc.html
• Good description of different generations of CT machines – http://www.kau.edu.sa/Files/0008512/Files/
19500_2nd_presentation_final.pdf – http://bme.ccny.cuny.edu/faculty/parra/teaching/med-imaging/
lecture4.pdf
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F16 Yao Wang @ NYU
Homework • Reading:
– Prince and Links, Medical Imaging Signals and Systems, Chap 6, Sec.6.1-6.3.3
• Note down all the corrections for Ch. 6 on your copy of the textbook based on the provided errata.
• Problems for Chap 6 of the text book: 1. P6.5 2. P6.14 (Note that you can leave the solution of part (a) in the
form of the convolution of two functions without deriving the actual convolution. For part (b) you could describe in terms of intuition.)
3. P6.17 4. The added problem in the following page
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Homework Added problem – Consider a 4x4 image that contains a diagonal line
I=[0,0,0,1;0,0,1,0;0,1,0,0;1,0,0,0]; • a) determine its projections in the directions: 0, 45,90,135 degrees. • b) determine the backprojected image from each projection; • c) determine the reconstructed images by using projections in the 0
and 90 degrees only. • d) determine the reconstructed images by using all projections.
Comment on the difference from c). – Note that for back-projection, you should normalize the
backprojection in each direction based on the total length of projection along that direction in the square area.
F16 Yao Wang @ NYU 57
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F16 Yao Wang @ NYU
Computer Assignment Due: Two weeks from lecture date
1. Learn how do ‘phantom’.’radon’,’iradon’ work; summarize their functionalities. Type ‘demos’ on the command line, then select ‘toolbox -> image processing -> transform -> reconstructing an image from projection data’. Alternatively, you can use ‘help’ for each particular function.
2. Write a MATLAB program that 1) generate a phantom image (you can use a standard phantom provided by MATLAB or construct your own), 2) produce projections in a specified number of angle, 3) reconstruct the phantom using backprojection summation; Your program should allow the user to specify the number of projection angle. Run your program with different number of projections for the same view angle, and the different view angles, and compare the quality. You should NOT use the ‘radon( )’ and ‘iradon()’ function in MATLAB.
3. Repeat 1 but uses filter backprojection method for step 3). In addition to the number of projection angles, you should be able to specify the filter among several filters provided by Matlab and the interpolation filters used for backprojection. Compare the reconstructed image quality obtained with different filters and interpolation methods for the same view angle and number of projections. You can use the “iradon()” function in MATLAB
4. Repeat 3 but uses convolution backprojection method. You have to write your own program.
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