On a computation method for eigenvalue problems and its application to statistical analysis

P, not in the open region R. For any such point P, let S, denote the closed segment of the net joining P to P, . For each k = 1, \* \* , 9, the point of S, n C closest to P will be called a boundary fioint of the net. The set of boundary points will be denoted b y C, . Some points of C, may be nodes

The aim of the work reported in this paper is to present the new formulation of the integral equation method for non-self-adjoint problems and to apply the method to stability problems of elastic continua subjected to non-conservative loadings. A general non-self-adjoint eigenvalue problem stated in

This paper considers the problem of finding the zeros of an operator G on a Hilbert space subject to a constraint of the general form P(x) = x. Convergence theorems are given for a class of iterative methods and, using these results, we derive several techniques for solving eigenvalue problems, one