Title :
An optimal Tikhonov regularized image restoration algorithm
Author :
Bin Zhang ; Ping Liu ; Ting-ting Bai ; Pan-pan Yan
Author_Institution :
Sch. of Sci., Commun. Univ. of China, Beijing, China
Abstract :
As the degraded image was recovered with regularization method, the blurred mtrix is a block circulant matrix which can be diagonalized by two dimension Fourier matrix, if the image boundary meets the periodic conditions. The restored image can be obtained by applying two dimensional discrete Fourier transform and its inverse transform. In practice, the regularization parameter affects restored result. For blurred image, the plot of MSE and ISNR as a function of regularization parameter was obtained by least squares fitting. selecting the arithmetic mean of minimum MSE point and maximum ISNR point as the optimal parameter, the corresponding restored image reach or close to the optimal MSE and ISNR.
Keywords :
Fourier transforms; curve fitting; image restoration; inverse transforms; least mean squares methods; matrix algebra; arithmetic mean; block circulant matrix; blurred matrix; degraded image recovery; image boundary; least squares fitting; maximum ISNR point; minimum MSE point; optimal Tikhonov regularized image restoration algorithm; optimal parameter; periodic conditions; regularization method; regularization parameter function; two dimensional Fourier matrix; two dimensional discrete Fourier transform; Boats; Educational institutions; Image edge detection; Image restoration; Inverse problems; Noise; Signal processing algorithms; image restoration; optimal regularization parameter;
Conference_Titel :
Image and Signal Processing (CISP), 2012 5th International Congress on
Conference_Location :
Chongqing
Print_ISBN :
978-1-4673-0965-3
DOI :
10.1109/CISP.2012.6469946
