Multilinear Karhunen-Loève Transforms.
IEEE Transactions on Signal Processing(2022)
Abstract
Many recent applications involve distributed signal processing where a source signal is observed by, say, p local receiver-transmitters and then transmitted to a reconstruction center for the signal estimation. An optimal determination of the receiver-transmitters and the reconstruction center requires extensions of the Karhunen-Loeve transform (KLT) and Wiener filter. In this paper, the associated extensions are provided. The proposed optimal multilinear filter is a generalization of the Wiener filter and consists of p terms where each term is associated with a local receiver-transmitter. For the case when the receiver-transmitters must reduce the dimensionality of the observed signals, two associated techniques are proposed: the multilinear KLT-1 and multilinear KLT-2. The multilinear KLT-1 is constructed in terms of pseudo-inverse matrices and therefore always exists. The multilinear KLT-2 is given in terms of non-singular matrices and it may provide a higher associated accuracy than that of the multilinear KLT-1. All three proposed techniques are based on a reduction of the original problem to p separate error minimization problems with small matrices. This allows us to provide a fast computational procedure for the multilinear filter, and decrease the computational cost for constructing the multilinear KLT-1 and KLT-2.
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Key words
Karhunen-Loeve transform,principal component analysis
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