Onur Yorulmaz

M. Tunç Arslan, Onur Yorulmaz, Erdinç L. Atılgan

Filters are the basic and most important blocks of most signal processing applications. In many applications, a group of parallel filters are used as filter banks. Parallel filter banks naturally require much more computations. Especially on chip applications, the resources are limited and shared among many algorithms. For this purpose, many filter optimization schemes are proposed to reduce the number of resources that filtering operations require. In this work, a novel optimization algorithm is proposed to decrease the number of operations in a group of parallel filters. The filter coefficients are grouped in a two stage process which enables increased coefficient sharing between different filters. The algorithm is capable of decreasing the number of registers, look-up tables and DSP48s by up to 50\% of a regular parallel filter bank, without requiring increased sampling rate.

Mohammad Tofighi, Onur Yorulmaz, A. Enis Cetin

In this article, two closed and convex sets for blind deconvolution problem are proposed. Most blurring functions in microscopy are symmetric with respect to the origin. Therefore, they do not modify the phase of the Fourier transform (FT) of the original image. As a result blurred image and the original image have the same FT phase. Therefore, the set of images with a prescribed FT phase can be used as a constraint set in blind deconvolution problems. Another convex set that can be used during the image reconstruction process is the epigraph set of Total Variation (TV) function. This set does not need a prescribed upper bound on the total variation of the image. The upper bound is automatically adjusted according to the current image of the restoration process. Both of these two closed and convex sets can be used as a part of any blind deconvolution algorithm. Simulation examples are presented.