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Intensity Transformations (Chapter 3)
CS474/674 – Prof. Bebis
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Spatial Domain Methods
f(x,y) g(x,y) Point Processing g(x,y) f(x,y) Area/Mask Processing
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Point Processing Transformations
Convert a given pixel value to a new pixel value based on some predefined function.
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Identity Transformation
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Negative Image O(r,c) = 255-I(r,c)
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Contrast Stretching or Compression
Stretch gray-level ranges where we desire more information (slope > 1). Compress gray-level ranges that are of little interest (0 < slope < 1).
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Thresholding Special case of contrast compression
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Intensity Level Slicing
Highlight specific ranges of gray-levels only. Same as double thresholding!
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Bit-level Slicing Highlighting the contribution made by a specific bit. For pgm images, each pixel is represented by 8 bits. Each bit-plane is a binary image
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Logarithmic transformation
Enhance details in the darker regions of an image at the expense of detail in brighter regions. compress stretch
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Exponential transformation
Reverse effect of that obtained using logarithmic mapping. stretch compress
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Histogram Equalization
A fully automatic gray-level stretching technique. Need to talk about image histograms first ...
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Image Histograms An image histogram is a plot of the gray-level frequencies (i.e., the number of pixels in the image that have that gray level).
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Image Histograms (cont’d)
Divide frequencies by total number of pixels to represent as probabilities.
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Image Histograms (cont’d)
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Properties of Image Histograms
Histograms clustered at the low end correspond to dark images. Histograms clustered at the high end correspond to bright images.
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Properties of Image Histograms (cont’d)
Histograms with small spread correspond to low contrast images (i.e., mostly dark, mostly bright, or mostly gray). Histograms with wide spread correspond to high contrast images.
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Properties of Image Histograms (cont’d)
Low contrast High contrast
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Histogram Equalization
The main idea is to redistribute the gray-level values uniformly.
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Histogram Equalization (cont’d)
In practice, the equalized histogram might not be completely flat.
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Probability - Definitions
Random experiment: an experiment whose result is not certain in advance (e.g., throwing a die) Outcome: the result of a random experiment Sample space: the set of all possible outcomes (e.g., {1,2,3,4,5,6}) Event: a subset of the sample space (e.g., obtain an odd number in the experiment of throwing a die = {1,3,5})
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Random Variables - Review
A function that assigns a real number to random experiment outcomes (i.e., helps to reduce space of possible outcomes) X(j) X: # of heads
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Random Variables - Example
Consider the experiment of throwing a pair of dice Define the r.v. X=“sum of dice” X=x corresponds to the event
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Probability density function
The probability density function (pdf) is a real-valued function fX(x) describing the density of probability at each point in the sample space. In the discrete case, this is just a histogram! Gaussian
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Probability distribution function
The integral of fX(x) defines the probability distribution function FX(x) (i.e., cumulative probability) In the discrete case, simply take the sum: fX(x) FX(x) Gaussian fX(a)da non-decreasing
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Probability distribution function (cont’d)
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Uniform Distribution fX(x) FX(x)
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Random Variable Transformations
Suppose Y=T(X) e.g., Y=X+1 If we know fX(x), can we find fY(y)? Yes - it can be shown that:
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Transformations of r.v. - Example
μ=0, σ=1 μ=1, σ=1
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Special transformation!
Proof:
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Histogram Equalization (cont’d)
The intensity levels can be viewed as a random variable in [0,1] pr(r) ps(s)
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Histogram Equalization (cont’d)
For PGM images: L=256 (graylevels) k=0,1,2, …, L-1 (possible graylevels) rk=k/(L-1) (normalized graylevel in [0, 1])
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Histogram Equalization (cont’d)
then, de-normalize: sk x (L-1)
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Histogram Equalization Example
3 bit 64 x 64 image input histogram equalized histogram
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Histogram Equalization Examples
original images and histograms equalized images and histograms
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Histogram Specification (Matching)
Histogram equalization yields a uniform pdf only. What if we want to obtain a histogram other than uniform? fR(r) fR(a)da fZ(a)da fZ(z) only desired histogram is known so, Q(r)=G-1(T(r))
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Histogram Specification (cont’d)
fS(s) and fV(v) are uniform G(z) can be computed by specifying fZ(z) but I2 and I’2 are unknown! z=G-1(v) requires that v is a r.v. with uniform pdf IDEA: use z=G-1(s) instead of z=G-1(v) s is a r.v. with uniform pdf The desired transformation is z=G-1(T(r)) fR(a)da fz(a)da
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Histogram Specification (cont’d)
Comments We do not need to apply T( ) and G-1( ) separately! Combine them: Q=G-1T, thus, z=Q(r) Histogram specification assumes that we know G-1 (not always easy to find). G( ) must be in [0,1] and must be non-decreasing. z=G-1(T(r))=Q(r)
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Histogram Specification Example
3 bit 64 x 64 image input histogram specified histogram actual histogram
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Histogram Specification (cont’d)
Histogram specification might yield superior results than histogram equalization. results of histogram equalization
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Histogram Specification (cont’d)
results of histogram specification G(z) G-1(z)
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Local Histogram Processing
Histogram equalization/specification are global methods. The intensity transformation is computed using pixels from the entire image. Global transformations are not appropriate for enhancing little details in an image. The number of pixels in these areas might be very small, contributing very little to the computation of the transformation.
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Local Histogram Processing
Idea: Define a transformation function based on the intensity distribution in a neighborhood of every pixel in the image!
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Local Histogram Processing (cont’d)
1. Define a neighborhood and move its center from pixel to pixel. 2. At each location, the histogram of the points in the neighborhood is computed. Obtain histogram equalization or histogram specification transformation. 3. Map the intensity of the pixel centered in the neighborhood. 4. Move to the next location and repeat the procedure.
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Local Histogram Processing: Example
equalization 3 x 3 neighborhood global histogram equalization
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Histogram Statistics Mean (average intensity) n-th moment around mean
Variance (2nd moment)
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Example: Comparison of Standard Deviation Values
σ is useful for estimating image contrast!
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Local Histogram Statistics
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Using Histogram Statistics for Image Enhancement
Useful when parts of the image might contain hidden features. Task: enhance dark areas without changing bright areas. Idea: Find dark, low contrast areas using local statistics.
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Using Histogram Statistics for Image Enhancement: Example
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Question Intensity operations can yield pixel values outside of the range [0 – 255]. You should convert values back to the range [0 – 255] to ensure that the image is displayed properly. How would you find the following mapping? [fmin – fmax] [ 0 – 255]
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