http://chineseinput.net/에서 pinyin(병음)방식으로 중국어를 변환할 수 있습니다.
변환된 중국어를 복사하여 사용하시면 됩니다.
A MODIFICATION OF GRADIENT METHOD OF CONVEX PROGRAMMING AND ITS IMPLEMENTATION
Stanimirovic, Predrag S.,Tasic, Milan B. 한국전산응용수학회 2004 Journal of applied mathematics & informatics Vol.16 No.1
A modification of the gradient method of convex programming is introduced. Also, we describe symbolic implementation of the gradient method and its modification by means of the programming language MATHEMATICA. A few numerical examples are reported.
COMPUTING DETERMINANTAL REPRESENTATION OF GENERALIZED INVERSES
Predrag S. Stanimirovic,Milan B. Tasic 한국전산응용수학회 2002 Journal of applied mathematics & informatics Vol.9 No.2
We investigate implementation of the determinantal representationof generalized inverses for complex and rational matricesin the symbolic package {ssr MATHEMATICA}.We also introduce an implementation which is applicable to sparse matrices.
A modification of gradient method of convex programming and its implementation
P. S. Stanimirovic,Milan B. Tasic 한국전산응용수학회 2004 Journal of applied mathematics & informatics Vol.16 No.-
A modification of the gradient method of convex programming is introduced. Also, we describe symbolic implementation of the gradient method and its modification by means of the programming language MATHEMATICA. A few numerical examples are reported.
COMPUTING DETERMINANTAL REPRESENTATION OF GENERALIZED INVERSES
Stanimirovic, Predrag-S.,Tasic, Milan-B. 한국전산응용수학회 2002 The Korean journal of computational & applied math Vol.9 No.2
We investigate implementation of the determinantal representation of generalized inverses for complex and rational matrices in the symbolic package MATHEMATICA. We also introduce an implementation which is applicable to sparse matrices.
COMPUTING GENERALIZED INVERSES OF A RATIONAL MATRIX AND APPLICATIONS
Stanimirovic, Predrag S.,Karampetakis, N. P.,Tasic, Milan B. 한국전산응용수학회 2007 Journal of applied mathematics & informatics Vol.24 No.1
In this paper we investigate symbolic implementation of two modifications of the Leverrier-Faddeev algorithm, which are applicable in computation of the Moore-Penrose and the Drazin inverse of rational matrices. We introduce an algorithm for computation of the Drazin inverse of rational matrices. This algorithm represents an extension of the papers [11] and [14]. and a continuation of the papers [15, 16]. The symbolic implementation of these algorithms in the package MATHEMATICA is developed. A few matrix equations are solved by means of the Drazin inverse and the Moore-Penrose inverse of rational matrices.