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1

Electronic Resource

On quadratic and $$O\left( {\sqrt {nL} } \right)$$ convergence of a predictor—corrector algorithm for LCP (1993)

Ye, Yinyu ; Anstreicher, Kurt

Springer

Mathematical programming 62 (1993), S. 537-551

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ISSN: 1436-4646

Keywords: Linear complementarity problem ; quadratic programming ; superlinear convergence ; quadratic convergence ; polynomial-time algorithm

Source: Springer Online Journal Archives 1860-2000

Topics: Computer Science , Mathematics

Notes: Abstract Recently several new results have been developed for the asymptotic (local) convergence of polynomial-time interior-point algorithms. It has been shown that the predictor—corrector algorithm for linear programming (LP) exhibits asymptotic quadratic convergence of the primal—dual gap to zero, without any assumptions concerning nondegeneracy, or the convergence of the iteration sequence. In this paper we prove a similar result for the monotone linear complementarity problem (LCP), assuming only that a strictly complementary solution exists. We also show by example that the existence of a strictly complementarity solution appears to be necessary to achieve superlinear convergence for the algorithm.

Type of Medium: Electronic Resource

URL: http://dx.doi.org/10.1007/BF01585182

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2

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An O(n 3 L) potential reduction algorithm for linear programming (1991)

Ye, Yinyu

Springer

Mathematical programming 50 (1991), S. 239-258

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ISSN: 1436-4646

Keywords: Linear programming ; primal and dual ; interior algorithms ; potential functions

Source: Springer Online Journal Archives 1860-2000

Topics: Computer Science , Mathematics

Notes: Abstract We describe a primal-dual potential function for linear programming: $$\phi (x,s) = \rho \ln (x^T s) - \sum\limits_{j = 1}^n {\ln (x_j s_j )} $$ whereρ⩾ n, x is the primal variable, ands is the dual-slack variable. As a result, we develop an interior point algorithm seeking reductions in the potential function with $$\rho = n + \sqrt n $$ . Neither tracing the central path nor using the projective transformation, the algorithm converges to the optimal solution set in $$O(\sqrt n L)$$ iterations and uses O(n 3 L) total arithmetic operations. We also suggest a practical approach to implementing the algorithm.

Type of Medium: Electronic Resource

URL: http://dx.doi.org/10.1007/BF01594937

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3

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On the convergence of the iteration sequence in primal-dual interior-point methods (1995)

Tapia, Richard A. ; Zhang, Yin ; Ye, Yinyu

Springer

Mathematical programming 68 (1995), S. 141-154

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ISSN: 1436-4646

Keywords: Linear programming ; Primal-dual interior-point algorithms ; Convergence of iteration sequence

Source: Springer Online Journal Archives 1860-2000

Topics: Computer Science , Mathematics

Notes: Abstract Recently, numerous research efforts, most of them concerned with superlinear convergence of the duality gap sequence to zero in the Kojima—Mizuno—Yoshise primal-dual interior-point method for linear programming, have as a primary assumption the convergence of the iteration sequence. Yet, except for the case of nondegeneracy (uniqueness of solution), the convergence of the iteration sequence has been an important open question now for some time. In this work we demonstrate that for general problems, under slightly stronger assumptions than those needed for superlinear convergence of the duality gap sequence (except of course the assumption that the iteration sequence converges), the iteration sequence converges. Hence, we have not only established convergence of the iteration sequence for an important class of problems, but have demonstrated that the assumption that the iteration sequence converges is redundant in many of the above mentioned works.

Type of Medium: Electronic Resource

URL: http://dx.doi.org/10.1007/BF01585761

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4

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On the complexity of approximating a KKT point of quadratic programming (1998)

Ye, Yinyu

Springer

Mathematical programming 80 (1998), S. 195-211

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ISSN: 1436-4646

Keywords: Quadratic programming ; KKT point ; Local minimizer ; Fully polynomial-time approximation scheme

Source: Springer Online Journal Archives 1860-2000

Topics: Computer Science , Mathematics

Notes: Abstract We present a potential reduction algorithm to approximate a Karush—Kuhn—Tucker (KKT) point of general quadratic programming (QP). We show that the algorithm is a fully polynomial-time approximation scheme, and its running-time dependency on accuracy ε ∈ (0, 1) is O((l/ε) log(l/ε) log(log(l/ε))), compared to the previously best-known result O((l/ε)2). Furthermore, the limit of the KKT point satisfies the second-order necessary optimality condition of being a local minimizer. © 1998 The Mathematical Programming Society, Inc. Published by Elsevier Science B.V.

Type of Medium: Electronic Resource

URL: http://dx.doi.org/10.1007/BF01581726

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5

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Comparative analysis of affine scaling algorithms based on simplifying assumptions (1991)

Ye, Yinyu

Springer

Mathematical programming 52 (1991), S. 405-414

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ISSN: 1436-4646

Keywords: Linear programming ; primal and dual ; potential reduction algorithm ; affine scaling algorithm

Source: Springer Online Journal Archives 1860-2000

Topics: Computer Science , Mathematics

Notes: Abstract We analyze several affine potential reduction algorithms for linear programming based on simplifying assumptions. We show that, under a strong probabilistic assumption regarding the distribution of the data in an iteration, the decrease in the primal potential function will be $$\Omega (\rho /\sqrt {log(n)} )$$ with high probability, compared to the guaranteedΩ(1). (ρ ⩾2n is a parameter in the potential function andn is the number of variables.) Under the same assumption, we further show that the objective reduction rate of Dikin's affine scaling algorithm is $$(1 - 1/\sqrt {log(n)} )$$ with high probability, compared to no guaranteed convergence rate.

Type of Medium: Electronic Resource

URL: http://dx.doi.org/10.1007/BF01582897

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6

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An extension of Karmarkar's projective algorithm for convex quadratic programming (1989)

Ye, Yinyu ; Tse, Edison

Springer

Mathematical programming 44 (1989), S. 157-179

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ISSN: 1436-4646

Keywords: Convex quadratic programming ; Karmarkar's LP algorithm ; ellipsoid method ; primal and dual

Source: Springer Online Journal Archives 1860-2000

Topics: Computer Science , Mathematics

Notes: Abstract We present an extension of Karmarkar's linear programming algorithm for solving a more general group of optimization problems: convex quadratic programs. This extension is based on the iterated application of the objective augmentation and the projective transformation, followed by optimization over an inscribing ellipsoid centered at the current solution. It creates a sequence of interior feasible points that converge to the optimal feasible solution in O(Ln) iterations; each iteration can be computed in O(Ln 3) arithmetic operations, wheren is the number of variables andL is the number of bits in the input. In this paper, we emphasize its convergence property, practical efficiency, and relation to the ellipsoid method.

Type of Medium: Electronic Resource

URL: http://dx.doi.org/10.1007/BF01587086

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7

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Finding an interior point in the optimal face of linear programs (1993)

Mehrotra, Sanjay ; Ye, Yinyu

Springer

Mathematical programming 62 (1993), S. 497-515

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ISSN: 1436-4646

Keywords: Linear programming ; primal—dual methods ; optimal face ; strict complementarity

Source: Springer Online Journal Archives 1860-2000

Topics: Computer Science , Mathematics

Notes: Abstract We study the problem of finding a point in the relative interior of the optimal face of a linear program. We prove that in the worst case such a point can be obtained in O(n 3 L) arithmetic operations. This complexity is the same as the complexity for solving a linear program. We also show how to find such a point in practice. We report and discuss computational results obtained for the linear programming problems in the NETLIB test set.

Type of Medium: Electronic Resource

URL: http://dx.doi.org/10.1007/BF01585180

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8

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Approximate Farkas lemmas and stopping rules for iterative infeasible-point algorithms for linear programming (1998)

Todd, Michael J. ; Ye, Yinyu

Springer

Mathematical programming 81 (1998), S. 1-21

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ISSN: 1436-4646

Keywords: Linear programming ; Farkas lemma ; Infeasible-interior-point methods ; Stopping rules

Source: Springer Online Journal Archives 1860-2000

Topics: Computer Science , Mathematics

Notes: Abstract In exact arithmetic, the simplex method applied to a particular linear programming problem instance with real data either shows that it is infeasible, shows that its dual is infeasible, or generates optimal solutions to both problems. Most interior-point methods, on the other hand, do not provide such clear-cut information. If the primal and dual problems have bounded nonempty sets of optimal solutions, they usually generate a sequence of primal or primaldual iterates that approach feasibility and optimality. But if the primal or dual instance is infeasible, most methods give less precise diagnostics. There are methods with finite convergence to an exact solution even with real data. Unfortunately, bounds on the required number of iterations for such methods applied to instances with real data are very hard to calculate and often quite large. Our concern is with obtaining information from inexact solutions after a moderate number of iterations. We provide general tools (extensions of the Farkas lemma) for concluding that a problem or its dual is likely (in a certain well-defined sense) to be infeasible, and apply them to develop stopping rules for a homogeneous self-dual algorithm and for a generic infeasible-interior-point method for linear programming. These rules allow precise conclusions to be drawn about the linear programming problem and its dual: either near-optimal solutions are produced, or we obtain “certificates” that all optimal solutions, or all feasible solutions to the primal or dual, must have large norm. Our rules thus allow more definitive interpretation of the output of such an algorithm than previous termination criteria. We give bounds on the number of iterations required before these rules apply. Our tools may also be useful for other iterative methods for linear programming. © 1998 The Mathematical Programming Society, Inc. Published by Elsevier Science B.V.

Type of Medium: Electronic Resource

URL: http://dx.doi.org/10.1007/BF01584841

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9

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On affine scaling algorithms for nonconvex quadratic programming (1992)

Ye, Yinyu

Springer

Mathematical programming 56 (1992), S. 285-300

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ISSN: 1436-4646

Keywords: Nonconvex quadratic programming ; affine-scaling algorithm ; interior algorithms ; NP-hard problems

Source: Springer Online Journal Archives 1860-2000

Topics: Computer Science , Mathematics

Notes: Abstract We investigate the use of interior algorithms, especially the affine-scaling algorithm, to solve nonconvex — indefinite or negative definite — quadratic programming (QP) problems. Although the nonconvex QP with a polytope constraint is a “hard” problem, we show that the problem with an ellipsoidal constraint is “easy”. When the “hard” QP is solved by successively solving the “easy” QP, the sequence of points monotonically converge to a feasible point satisfying both the first and the second order optimality conditions.

Type of Medium: Electronic Resource

URL: http://dx.doi.org/10.1007/BF01580903

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10

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On the finite convergence of interior-point algorithms for linear programming (1992)

Ye, Yinyu

Springer

Mathematical programming 57 (1992), S. 325-335

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ISSN: 1436-4646

Keywords: Strict complementarity ; interior point algorithms ; linear programming ; optimal face

Source: Springer Online Journal Archives 1860-2000

Topics: Computer Science , Mathematics

Notes: Abstract It has been shown [8] that numerous interior-point algorithms for linear programming (LP) generate solution sequences that converge to strict complementarity solutions, or interior solutions on the optimal face. In this note we further establish a theoretical base for Gay's test (Gay, 1989) to identify the optimal face, and develop a new termination procedure to obtain an exact solution on the optimal face. We also report some numerical results for solving a set of LP test problems, each of which has a highly degenerate and unbounded optimal face.

Type of Medium: Electronic Resource

URL: http://dx.doi.org/10.1007/BF01581087

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