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6/10/20161 Digital Image Processing Lecture 09: Image Restoration-I Naveed Ejaz
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6/10/20162 Image Restoration In many applications (e.g., satellite imaging, medical imaging, astronomical imaging, poor-quality family portraits) the imaging system introduces a slight distortion Image Restoration attempts to reconstruct or recover an image that has been degraded by using a priori knowledge of the degradation phenomenon. Restoration techniques try to model the degradation and then apply the inverse process in order to recover the original image.
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6/10/20163 Image Restoration Image restoration attempts to restore images that have been degraded –Identify the degradation process and attempt to reverse it –Similar to image enhancement, but more objective
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6/10/20164 A Model of the Image Degradation/ Restoration Process
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6/10/20165 A Model of the Image Degradation/ Restoration Process The degradation process can be modeled as a degradation function H that, together with an additive noise term η(x,y) operates on an input image f(x,y) to produce a degraded image g(x,y)
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6/10/20166 A Model of the Image Degradation/ Restoration Process Since the degradation due to a linear, space-invariant degradation function H can be modeled as convolution, therefore, the degradation process is sometimes referred to as convolving the image with as PSF or OTF. Similarly, the restoration process is sometimes referred to as deconvolution.
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6/10/20167 Image Restoration If we are provided with the following information –The degraded image g(x,y) –Some knowledge about the degradation function H, and – Some knowledge about the additive noise η(x,y) Then the objective of restoration is to obtain an estimate f ˆ (x,y) of the original image
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6/10/20168 Principle Sources of Noise Image Acquisition –Image sensors may be affected by Environmental conditions (light levels etc) –Quality of Sensing Elements (can be affected by e.g. temperature) Image Transmission –Interference in the channel during transmission e.g. lightening and atmospheric disturbances
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6/10/20169 Noise Model Assumptions Independent of Spatial Coordinates Uncorrelated with the image i.e. no correlation between Pixel Values and the Noise Component
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6/10/201610 White Noise When the Fourier Spectrum of noise is constant the noise is called White Noise The terminology comes from the fact that the white light contains nearly all frequencies in the visible spectrum in equal proportions The Fourier Spectrum of a function containing all frequencies in equal proportions is a constant
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6/10/201611 Noise Models: Gaussian Noise
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6/10/201612 Noise Models: Gaussian Noise Approximately 70% of its value will be in the range [(µ- σ), (µ+σ)] and about 95% within range [(µ-2σ), (µ+2σ)] Gaussian Noise is used as approximation in cases such as Imaging Sensors operating at low light levels
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6/10/201613 Noise Models: Rayleigh Noise Rayleigh Noise arises in Range Imaging
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6/10/201614 Noise Models: Erlang (Gamma) Noise Rayleigh Noise arises in Laser Imaging
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6/10/201615 Noise Models: Exponential Noise
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6/10/201616 Noise Models: Uniform Noise
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6/10/201617 Noise Models: Impulse (Salt and Pepper) Noise
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6/10/201618 Applicability of Various Noise Models
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6/10/201619 Noise Models
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6/10/201620 Noise Models
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6/10/201621 Noise Models
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6/10/201622 Noise Patterns (Example)
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6/10/201623 Image Corrupted by Gaussian Noise
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6/10/201624 Image Corrupted by Rayleigh Noise
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6/10/201625 Image Corrupted by Gamma Noise
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6/10/201626 Image Corrupted by Salt & Pepper Noise
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6/10/201627 Image Corrupted by Uniform Noise
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6/10/201628 Noise Patterns (Example)
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6/10/201629 Noise Patterns (Example)
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6/10/201630 Periodic Noise Arises typically from Electrical or Electromechanical interference during Image Acquisition Nature of noise is Spatially Dependent Can be removed significantly in Frequency Domain
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6/10/201631 Periodic Noise (Example)
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6/10/201632 Estimation of Noise Parameters
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6/10/201633 Estimation of Noise Parameters (Example)
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6/10/201634 Estimation of Noise Parameters
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6/10/201635 Restoration of Noise-Only Degradation
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6/10/201636 Restoration of Noise Only- Spatial Filtering
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6/10/201637 Arithmetic Mean Filter
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6/10/201638 Geometric and Harmonic Mean Filter
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6/10/201639 Contra-Harmonic Mean Filter
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6/10/201640 Classification of Contra-Harmonic Filter Applications
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6/10/201641 Arithmetic and Geometric Mean Filters (Example)
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6/10/201642 Contra-Harmonic Mean Filter (Example)
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6/10/201643 Contra-Harmonic Mean Filter (Example)
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6/10/201644 Order Statistics Filters: Median Filter
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6/10/201645 Median Filter (Example)
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6/10/201646 Order Statistics Filters: Max and Min filter
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6/10/201647 Max and Min Filters (Example)
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6/10/201648 Order Statistics Filters: Midpoint Filter
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6/10/201649 Order Statistics Filters: Alpha-Trimmed Mean Filter
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6/10/201650 Examples
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