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f = u+n: f is noisy image, u is an desired reconstruction and n is noise.

The reconstruction error is ||u-f||_2^2 + lambda * ||gradient(u)||_2^2

Solve ||Ax-b||_2^2 where x is a vector that is vectorised from f in column-wise.

the above is my problem and I can't understand what means "solve ||Ax-b||_2^2". what is 'A'? what is 'b'? How can get 'the reconstruction'?

I know the simple way of find minimizing least square using pseudo inverse. But I just adjusted the way on find θ in ||Aθ-b||^2.

I don't know what I have to do. So I did what can I do.

import matplotlib.pyplot as plt
import numpy as np
from scipy import signal 
from skimage import io, color
from skimage import exposure

file_image  = 'image.jpg'

im_color    = io.imread(file_image)
im_gray     = color.rgb2gray(im_color)
im          = (im_gray - np.mean(im_gray)) / np.std(im_gray)
(row, col)  = im.shape

noise_std   = 0.2 # try with varying noise standard deviation
noise       = np.random.normal(0, noise_std, (row, col))
im_noise    = im + noise

I made a noisy image. and I don't know next step.

Is there anyone who can explain?

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  • Please edit the question, as you can see there is no problem description. Dec 11, 2018 at 5:54

1 Answer 1

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This very much looks like a poorly phrased homework question. I have a fair background in mathematical image processing and inverse problems so I rewrote it for you the only way it makes sense.

Let f be a noisy image described by the relationship f = u+n, where u is a noise-free image and n is the noise. The goal is to recover u from n. To do this, we introduce the following function

||u - f||²,

which is equal to the squared summed difference between all pixels in u and f, to measure the similarity between u and f. Furthermore, we introduce the following function to measure the amount of noise in the image

||Du||²,

where Du(x, y) represents the magnitude of the gradient of u at position (x, y), as a measure of the noise in an image. By ||Du||², we therefore mean the squared sum of the gradient in all pixels.

A way to measure how well we have reconstructed the noise-free image can then be represented by the following function

||u - f||² + ||Du||²

Solve the regularised least squares problem above.

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