Eigen Transformations of Symmetric Matrices in Information Processing Problems

Abstract

The mathematical justification of the algorithm for synthesis of proper transformation and the finding the eigenvalue of a symmetric matrix of dimension based on orthogonal rotation operators is given. Analytical relations for calculating the eigenvalues of symmetric matrix is optained. It is shown that the proper transformation has factorized structure in the form of a product of rotation operators. Each operator is a direct sum of elementary rotation matrices.