Construction and features of the optimum rational function used in the ADI-method
Investigation of the algorithms determining the optimum rational function of the ADI-method
Strict spectral approximation of a matrix and some related problems
We show how the strict spectral approximation can be used to obtain characterizations and properties of solutions of some problems in the linear space of matrices. Namely, we deal with (i) approximation problems with singular values preserving functions, (ii) the Moore-Penrose generalized inverse. Some properties of approximation by positive semi-definite matrices are commented.
On the optimum rational function connected with the ADI-method
Evaluation of coefficients of a double Chebyshev series of the function g(p(x+y))
Double Chebyshev series for hypergeometric functions of two variables
We give formulas for the coefficients of a double Chebyshev series for a hypergeometric function of two variables x and y. We express these coefficients in terms of other hypergeometric functions of two variables. In particular, for hypergeometric functions expressed in terms of corresponding hypergeometric functions of one variable with an argument of the form x+y, the Chebyshev coefficients are values of another hypergeometric function of one variable. In Section 1 we give basic information on...
Recursive relations between coefficients of a double Chebyshev series for the function Tn[p(x+y)]
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The polar decomposition- properties, applications and algorithms
In the paper we review the numerical methods for computing the polar decomposition of a matrix. Numerical tests comparing these methods are included. Moreover, the applications of the polar decomposition and the most important its properties are mentioned.
Algorithms for the matrix sector function.
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