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1

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LU decompositions of generalized diagonally dominant matrices (1982)

Funderlic, R. E. ; Neumann, M. ; Plemmons, R. J.

Springer

Numerische Mathematik 40 (1982), S. 57-69

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ISSN: 0945-3245

Keywords: AMS(MOS): 65F05 ; CR: 5.14

Source: Springer Online Journal Archives 1860-2000

Topics: Mathematics

Notes: Summary Using the simple vehicle ofM-matrices, the existence and stability ofLU decompositions of matricesA which can be scaled to diagonally dominant (possibly singular) matrices are investigated. Bounds on the growth factor for Gaussian elimination onA are derived. Motivation for this study is provided in part by applications to solving homogeneous systems of linear equationsAx=0, arising in Markov queuing networks, input-output models in economics and compartmental systems, whereA or −A is an irreducible, singularM-matrix. This paper extends earlier work by Funderlic and Plemmons and by Varga and Cai.

Type of Medium: Electronic Resource

URL: http://dx.doi.org/10.1007/BF01459075

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2

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Regular splittings and the discrete Neumann problem (1976)

Plemmons, R. J.

Springer

Numerische Mathematik 25 (1976), S. 153-161

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ISSN: 0945-3245

Source: Springer Online Journal Archives 1860-2000

Topics: Mathematics

Notes: Summary Iterative methods are discussed for approximating a solution to a singular but consistent square linear systemAx=b. The methods are based upon splittingA=M−N withM nonsingular. Monotonicity and the concept of regular splittings, introduced by Varga, are used to determine some necessary and some sufficient conditions in order that the iterationx i+1=M−1Nxi+M−1b converge to a solution to the linear system. Finally, applications are given to solving the discrete Neumann problem by iteration which are based upon the inherent monotonicity in the formulation.

Type of Medium: Electronic Resource

URL: http://dx.doi.org/10.1007/BF01462269

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3

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An algorithm to compute a sparse basis of the null space (1985)

Berry, M. W. ; Heath, M. T. ; Kaneko, I. ; [et al.]

Springer

Numerische Mathematik 47 (1985), S. 483-504

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ISSN: 0945-3245

Keywords: AMS(MOS) ; 65F30 ; CR: G1.3

Source: Springer Online Journal Archives 1860-2000

Topics: Mathematics

Notes: Summary LetA be a realm×n matrix with full row rankm. In many algorithms in engineering and science, such as the force method in structural analysis, the dual variable method for the Navier-Stokes equations or more generally null space methods in quadratic programming, it is necessary to compute a basis matrixB for the null space ofA. HereB isn×r, r=n−m, of rankr, withAB=0. In many instancesA is large and sparse and often banded. The purpose of this paper is to describe and test a variation of a method originally suggested by Topcu and called the turnback algorithm for computing a banded basis matrixB. Two implementations of the algorithm are given, one using Gaussian elimination and the other using orthogonal factorization by Givens rotations. The FORTRAN software was executed on an IBM 3081 computer with an FPS-164 attached array processor at the Triangle Universities Computing Center and on a CYBER 205 vector computer. Test results on a variety of structural analysis problems including two- and three-dimensional frames, plane stress, plate bending and mixed finite element problems are discussed. These results indicate that both implementations of the algorithm yielded a well-conditioned, banded, basis matrixB whenA is well-conditioned. However, the orthogonal implementation yielded a better conditionedB for large, illconditioned problems.

Type of Medium: Electronic Resource

URL: http://dx.doi.org/10.1007/BF01389453

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4

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Convergent nonnegative matrices and iterative methods for consistent linear systems (1978)

Neumann, M. ; Plemmons, R. J.

Springer

Numerische Mathematik 31 (1978), S. 265-279

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ISSN: 0945-3245

Keywords: AMS(MOS): 65 F 10 ; CR: 5.14

Source: Springer Online Journal Archives 1860-2000

Topics: Mathematics

Notes: Summary In this paper we study linear stationary iterative methods with nonnegative iteration matrices for solving singular and consistent systems of linear equationsAx=b. The iteration matrices for the schemes are obtained via regular and weak regular splittings of the coefficients matrixA. In certain cases when only some necessary, but not sufficient, conditions for the convergence of the iterations schemes exist, we consider a transformation on the iteration matrices and obtain new iterative schemes which ensure convergence to a solution toAx=b. This transformation is parameter-dependent, and in the case where all the eigenvalues of the iteration matrix are real, we show how to choose this parameter so that the asymptotic convergence rate of the new schemes is optimal. Finally, some applications to the problem of computing the stationary distribution vector for a finite homogeneous ergodic Markov chain are discussed.

Type of Medium: Electronic Resource

URL: http://dx.doi.org/10.1007/BF01397879

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5

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Backward error analysis for linear systems associated with inverses ofH-matrices (1984)

Neumann, M. ; Plemmons, R. J.

Springer

BIT 24 (1984), S. 102-112

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ISSN: 1572-9125

Source: Springer Online Journal Archives 1860-2000

Topics: Mathematics

Notes: Abstract In this paper, bounds on the growth factors resulting from Gaussian elimination applied to inverses ofH-matrices are developed and investigated. These bounds are then used in the error analysis for solving linear systemsAx =b whose coefficient matricesA are of this type. For each such system our results show that the Gaussian elimination without pivoting can proceed safely provided that the elements of the inverse of a certainM-matrix (associated with the coefficient matrixA) are not excessively large. We exhibit a particularly satisfactory situation for the special case whenA itself is an inverse of anM-matrix. Part of the first section of this paper is devoted to a discussion on some results of de Boor and Pinkus for the stability of triangular factorizations of systemsAx =b, whereA is a nonsingular totally nonnegative matrix, and to the explanation of why the analysis of de Boor and Pinkus is not applicable to the case when the coefficient matrixA is an inverse of anM-matrix.

Type of Medium: Electronic Resource

URL: http://dx.doi.org/10.1007/BF01934520

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6

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Minimum norm solutions to linear elastic analysis problems (1984)

Kaneko, I. ; Plemmons, R. J.

Chichester [u.a.] : Wiley-Blackwell

International Journal for Numerical Methods in Engineering 20 (1984), S. 983-998

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ISSN: 0029-5981

Keywords: Engineering ; Engineering General

Source: Wiley InterScience Backfile Collection 1832-2000

Topics: Mathematics , Technology

Notes: A basic problem in the linear elastic analysis is that of finding the vectors of stresses and strains, given a finite element model of a structure and a set of external loads. One purpose of this paper is to show that the problem is a special case of the minimum norm problem for underdetermined systems of linear equations. In this regard, the three conventional structural analysis approaches, i.e. the displacement method, the natural factor formulation and the force method, are unified and interpreted in the framework of the minimum norm problem, which is divided into two approaches - the primal formulation and the dual formulation. Numerical comparisons of several computational procedures capable of solving the minimum norm problem are given from computational efficiency and accuracy points of view. Included in the comparisons are the three conventional structural analysis approaches mentioned above, and several alternative approaches.

Additional Material: 1 Tab.

Type of Medium: Electronic Resource

URL: http://dx.doi.org/10.1002/nme.1620200602

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