Title :
New algorithms for computing the minimum eigenpair of the generalized symmetric eigenvalue problem
Author :
Hasan, Mohammed A.
Author_Institution :
Dept. of Electr. & Comput. Eng., Minnesota Univ., Duluth, MN, USA
Abstract :
Novel methods for computing the minimal eigenvalue of a symmetric positive-definite matrix are presented. The smallest eigenpair (eigenvalue and corresponding eigenvector) of a covariance matrix are computed using the techniques of constrained optimization and higher order root iteration methods. An implementation that relies on QR factorization and less on matrix inversion is presented. This approach can also be used to compute the largest eigenpair by appropriately choosing the initial condition and also can be shown to be applicable to any Hermitian matrix. Several randomly generated test problems are used to evaluate the performance and the computational cost of the methods.
Keywords :
Hermitian matrices; covariance matrices; eigenvalues and eigenfunctions; iterative methods; minimisation; optimisation; signal processing; Hermitian matrix; QR factorization; computational cost; constrained optimization; covariance matrix; eigenvalue; eigenvector; generalized symmetric eigenvalue problem; higher order root iteration methods; initial condition; matrix inversion; minimal eigenvalue; minimum eigenpair computation algorithms; performance evaluation; randomly generated test problems; symmetric positive-definite matrix; Additive noise; Computational efficiency; Covariance matrix; Eigenvalues and eigenfunctions; Frequency estimation; Newton method; Optimization methods; Signal processing algorithms; Symmetric matrices; Testing;
Conference_Titel :
Circuits and Systems, 2002. ISCAS 2002. IEEE International Symposium on
Print_ISBN :
0-7803-7448-7
DOI :
10.1109/ISCAS.2002.1010570
