Title :
Multidimensional Filter Bank Signal Reconstruction From Multichannel Acquisition
Author :
Law, Ka Lung ; Do, Minh N.
Author_Institution :
Dept. of Math., Univ. of Illinois at Urbana-Champaign, Urbana, IL, USA
Abstract :
We study the theory and algorithms of an optimal use of multidimensional signal reconstruction from multichannel acquisition by using a filter bank setup. Suppose that we have an -channel convolution system, referred to as analysis filters, in dimensions. Instead of taking all the data and applying multichannel deconvolution, we first reduce the collected data set by an integer uniform sampling matrix , and then search for a synthesis polyphase matrix which could perfectly reconstruct any input discrete signal. First, we determine the existence of perfect reconstruction (PR) systems for a given set of finite-impulse response (FIR) analysis filters. Second, we present an efficient algorithm to find a sampling matrix with maximum sampling rate and to find a FIR PR synthesis polyphase matrix for a given set of FIR analysis filters. Finally, once a particular FIR PR synthesis polyphase matrix is found, we can characterize all FIR PR synthesis matrices, and then find an optimal one according to design criteria including robust reconstruction in the presence of noise.
Keywords :
FIR filters; convolution; deconvolution; multidimensional digital filters; multidimensional signal processing; signal detection; signal reconstruction; signal sampling; FIR PR synthesis polyphase matrix; FIR analysis filters; N analysis filters; N-channel convolution system; discrete signal reconstruction; filter bank setup; finite-impulse response analysis filters; integer uniform sampling matrix; multichannel acquisition; multichannel deconvolution; multidimensional filter bank signal reconstruction; polyphase matrix; sampling matrix; Algorithm design and analysis; Filter bank; Finite impulse response filter; Image reconstruction; Matrix decomposition; Polynomials; Signal reconstruction; Filter bank; finite-impulse response (FIR) multidimensional filters; multichannel acquisition; multidimensional sampling; perfect reconstruction;
Journal_Title :
Image Processing, IEEE Transactions on
DOI :
10.1109/TIP.2010.2066980
