Title :
Multidimensional, paraunitary principal component filter banks
Author :
Xuan, Bo ; Bamberger, Roberto H.
Author_Institution :
Hughes Network Syst. Inc., Germantown, MD, USA
fDate :
10/1/1998 12:00:00 AM
Abstract :
In this correspondence, the one-dimensional (1-D) principal component filter banks (PCFB´s) derived by Tsatsatsanis and Giannakis (1995) are generalized to higher dimensions. As presented by Tsatsatsanis and Giannakis, PCFB´s minimize the mean-squared error (MSE) when only Q out of P subbands are retained. Previously, two-dimensional (2-D) PCFB´s were proposed by Tirakis et al. (1995). The work by Tirakis et al. was limited to 2-D signals and separable resampling operators. The formulation presented here is general in that it can easily accommodate signals of arbitrary (yet finite) dimension and nonseparable sampling. A major result presented in this paper is that in addition to minimizing MSE when reconstructing from Q out of p subbands, the PCFB´s result in maximizing theoretical coding gain (TCG) thereby performing optimally in a energy compaction sense
Keywords :
filtering theory; least mean squares methods; multidimensional digital filters; signal reconstruction; signal sampling; MSE; arbitrary dimensional signals; energy compaction sense; mean-squared error minimisation; multidimensional filter banks; nonseparable sampling; paraunitary principal component filter banks; theoretical coding gain maximisation; Band pass filters; Channel bank filters; Compaction; Filter bank; Image reconstruction; Multidimensional systems; Signal analysis; Signal design; Signal processing; Signal synthesis;
Journal_Title :
Signal Processing, IEEE Transactions on
