Litcius/Paper detail

Eigenvalue Decomposition of a Parahermitian Matrix: Extraction of Analytic Eigenvalues

Stephan Weiss, Ian K. Proudler, Fraser K. Coutts

2021IEEE Transactions on Signal Processing49 citationsDOI

Abstract

An analytic parahermitian matrix admits an eigenvalue decomposition (EVD) with analytic eigenvalues and eigenvectors except in the case of multiplexed data. In this paper, we propose an iterative algorithm for the estimation of the analytic eigenvalues. Since these are generally transcendental, we find a polynomial approximation with a defined error. Our approach operates in the discrete Fourier transform (DFT) domain and for every DFT length generates a maximally smooth association through EVDs evaluated in DFT bins; an outer loop iteratively grows the DFT order and is shown, in general, to converge to the analytic eigenvalues. In simulations, we compare our results to existing approaches.

Topics & Concepts

Eigenvalues and eigenvectorsMathematicsApplied mathematicsEigendecomposition of a matrixMatrix differential equationDiscrete Fourier transform (general)Spectrum of a matrixIterative methodMatrix (chemical analysis)Matrix decompositionPolynomialDivide-and-conquer eigenvalue algorithmInverse iterationMathematical analysisAlgorithmFourier transformFractional Fourier transformFourier analysisDifferential equationPhysicsQuantum mechanicsMaterials scienceComposite materialMatrix Theory and AlgorithmsAdvanced Adaptive Filtering TechniquesBlind Source Separation Techniques