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  • 1
    Electronic Resource
    Electronic Resource
    A polynomial method of approximate centers for linear programming (1992)
    Springer
    Mathematical programming 54 (1992), S. 295-305 
    Details
    ISSN: 1436-4646
    Keywords: Interior-point method ; linear programming ; Karmarkar's method ; polynomial-time algorithm ; logarithmic barrier function ; path-following method
    Source: Springer Online Journal Archives 1860-2000
    Topics: Computer Science , Mathematics
    Notes: Abstract We present a path-following algorithm for the linear programming problem with a surprisingly simple and elegant proof of its polynomial behaviour. This is done both for the problem in standard form and for its dual problem. We also discuss some implementation strategies.
    Type of Medium: Electronic Resource
    URL: http://dx.doi.org/10.1007/BF01586056
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    Paper (German National Licenses)
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  • 2
    Electronic Resource
    Electronic Resource
    A logarithmic barrier cutting plane method for convex programming (1995)
    Springer
    Annals of operations research 58 (1995), S. 67-98 
    Details
    ISSN: 1572-9338
    Keywords: Column generation ; convex programming ; cutting plane methods ; decomposition ; interior point method ; linear programming ; logarithmic barrier function ; nonsmooth optimization ; semi-infinite programming
    Source: Springer Online Journal Archives 1860-2000
    Topics: Mathematics , Economics
    Notes: Abstract The paper presents a logarithmic barrier cutting plane algorithm for convex (possibly non-smooth, semi-infinite) programming. Most cutting plane methods, like that of Kelley, and Cheney and Goldstein, solve a linear approximation (localization) of the problem and then generate an additional cut to remove the linear program's optimal point. Other methods, like the “central cutting” plane methods of Elzinga-Moore and Goffin-Vial, calculate a center of the linear approximation and then adjust the level of the objective, or separate the current center from the feasible set. In contrast to these existing techniques, we develop a method which does not solve the linear relaxations to optimality, but rather stays in the interior of the feasible set. The iterates follow the central path of a linear relaxation, until the current iterate either leaves the feasible set or is too close to the boundary. When this occurs, a new cut is generated and the algorithm iterates. We use the tools developed by den Hertog, Roos and Terlaky to analyze the effect of adding and deleting constraints in long-step logarithmic barrier methods for linear programming. Finally, implementation issues and computational results are presented. The test problems come from the class of numerically difficult convex geometric and semi-infinite programming problems.
    Type of Medium: Electronic Resource
    URL: http://dx.doi.org/10.1007/BF02032162
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    Paper (German National Licenses)
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  • 3
    Electronic Resource
    Electronic Resource
    New Complexity Analysis of the Primal—Dual Newton Method for Linear Optimization (2000)
    Springer
    Annals of operations research 99 (2000), S. 23-39 
    Details
    ISSN: 1572-9338
    Keywords: linear optimization ; interior-point method ; primal–dual method ; proximity measure ; polynomial complexity
    Source: Springer Online Journal Archives 1860-2000
    Topics: Mathematics , Economics
    Notes: Abstract We deal with the primal–dual Newton method for linear optimization (LO). Nowadays, this method is the working horse in all efficient interior point algorithms for LO, and its analysis is the basic element in all polynomiality proofs of such algorithms. At present there is still a gap between the practical behavior of the algorithms and the theoretical performance results, in favor of the practical behavior. This is especially true for so-called large-update methods. We present some new analysis tools, based on a proximity measure introduced by Jansen et al., in 1994, that may help to close this gap. This proximity measure has not been used in the analysis of large-update methods before. The new analysis does not improve the known complexity results but provides a unified way for the analysis of both large-update and small-update methods.
    Type of Medium: Electronic Resource
    URL: http://dx.doi.org/10.1023/A:1019280614748
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  • 4
    Electronic Resource
    Electronic Resource
    On the classical logarithmic barrier function method for a class of smooth convex programming problems (1992)
    Springer
    Journal of optimization theory and applications 73 (1992), S. 1-25 
    Details
    ISSN: 1573-2878
    Keywords: Convex programming ; interior point method ; logarithmic barrier function ; Newton method
    Source: Springer Online Journal Archives 1860-2000
    Topics: Mathematics
    Notes: Abstract In this paper, we describe a natural implementation of the classical logarithmic barrier function method for smooth convex programming. It is assumed that the objective and constraint functions fulfill the so-called relative Lipschitz condition, with Lipschitz constantM〉0. In our method, we do line searches along the Newton direction with respect to the strictly convex logarithmic barrier function if we are far away from the central trajectory. If we are sufficiently close to this path, with respect to a certain metric, we reduce the barrier parameter. We prove that the number of iterations required by the algorithm to converge to an ε-optimal solution isO((1+M 2) $$\sqrt n $$ ∣logε∣) orO((1+M 2)n∣logε∣), depending on the updating scheme for the lower bound.
    Type of Medium: Electronic Resource
    URL: http://dx.doi.org/10.1007/BF00940075
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    Paper (German National Licenses)
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  • 5
    Electronic Resource
    Electronic Resource
    Polynomial Primal-Dual Affine Scaling Algorithms in Semidefinite Programming (1998)
    Springer
    Journal of combinatorial optimization 2 (1998), S. 51-69 
    Details
    ISSN: 1573-2886
    Keywords: interior-point method ; primal-dual method ; semidefinite programming ; affine scaling ; Dikin steps
    Source: Springer Online Journal Archives 1860-2000
    Topics: Mathematics
    Notes: Abstract Two primal-dual affine scaling algorithms for linear programming are extended to semidefinite programming. The algorithms do not require (nearly) centered starting solutions, and can be initiated with any primal-dual feasible solution. The first algorithm is the Dikin-type affine scaling method of Jansen et al. (1993b) and the second the classical affine scaling method of Monteiro et al. (1990). The extension of the former has a worst-case complexity bound of O(τ0nL) iterations, where τ0 is a measure of centrality of the the starting solution, and the latter a bound of O(τ0nL2) iterations.
    Type of Medium: Electronic Resource
    URL: http://dx.doi.org/10.1023/A:1009791827917
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    Paper (German National Licenses)
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  • 6
    Electronic Resource
    Electronic Resource
    Primal-dual algorithms for linear programming based on the logarithmic barrier method (1994)
    Springer
    Journal of optimization theory and applications 83 (1994), S. 1-26 
    Details
    ISSN: 1573-2878
    Keywords: Linear programming ; primal-dual interior point methods ; logarithmic barrier function ; polynomial algorithms
    Source: Springer Online Journal Archives 1860-2000
    Topics: Mathematics
    Notes: Abstract In this paper, we deal with primal-dual interior point methods for solving the linear programming problem. We present a short-step and a long-step path-following primal-dual method and derive polynomial-time bounds for both methods. The iteration bounds are as usual in the existing literature, namely $$O(\sqrt n L)$$ iterations for the short-step variant andO(nL) for the long-step variant. In the analysis of both variants, we use a new proximity measure, which is closely related to the Euclidean norm of the scaled search direction vectors. The analysis of the long-step method depends strongly on the fact that the usual search directions form a descent direction for the so-called primal-dual logarithmic barrier function.
    Type of Medium: Electronic Resource
    URL: http://dx.doi.org/10.1007/BF02191759
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    Paper (German National Licenses)
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