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National Repository of Grey Literature

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	Transformations enabling to construct limited-memory Broyden class methods Vlček, Jan ; Lukšan, Ladislav Fulltext: content.csg - PDF Plný tet: v1037-08 - PDF Detailed record
	Limited-memory projective variable metric methods for unconstrained minimization Vlček, Jan ; Lukšan, Ladislav Fulltext: content.csg - PDF Plný tet: v1036-08 - PDF Detailed record
	Metody s proměnnou metrikou s omezenou pamětí, založené na invariantních maticích Vlček, Jan ; Lukšan, Ladislav A new class of limited-memory variable metric methods for unconstrained minimization is described. Approximations of inverses of Hessian matrices are based on matrices which are invariant with respect to a linear transformation. As these matrices are singular, they are adjusted for a computation of direction vectors. The methods have the quadratic termination property, which means that they will find a minimum of a strict quadratic function with an exact choice of a step-length after a finite number of steps. Numerical experiments show the efficiency of this method. Detailed record
	O Lagrangeových multiplikátorech v metodách s lokálně omezeným krokem Lukšan, Ladislav ; Matonoha, Ctirad ; Vlček, Jan Trust-region methods are globally convergent techniques widely used, for example, in connection with the Newton's method for unconstrained optimization. One of the most commonly-used iterative approaches for solving the trust-region subproblems is the Steihaug-Toint method which is based on conjugate gradient iterations and seeks a solution on Krylov subspaces. The paper contains new theoretical results concerning properties of Lagrange multipliers obtained on these subspaces. Detailed record
	Metody vnitřních bodů pro zobecněnou minimaxovou optimalizaci Lukšan, Ladislav ; Matonoha, Ctirad ; Vlček, Jan A new class of primal interior point methods for generalized minimax optimization is described. These methods use besides a standard logarithmic barrier function also barrier functions bounded from below which have more favourable properties for investigation of global convergence. It deals with descent direction methods, where an approxmation of the Hessian matrix is computed by gradient differences or quasi-Newton updates. Two-level optimization is used. A direction vector is computed by a Choleski decompostition of a sparse matrix. Numerical experiments concerning two basic applications, minimization of a point maximum and a sum of absolute values of smooth functions, are presented. Detailed record
	Primal Interior Point Method for Minimization of Generalized Minimax Functions Lukšan, Ladislav ; Matonoha, Ctirad ; Vlček, Jan Fulltext: content.csg - PDF Plný tet: v1017-07 - PDF Detailed record
	Implementace automatického derivování v systému UFO Hartman, J. ; Lukšan, Ladislav Fulltext: content.csg - PDF Plný tet: v1002-07 - PDF Detailed record
	Automatic Differentiation and its Program Realization Hartman, J. ; Lukšan, Ladislav ; Zítko, J. Fulltext: content.csg - PDF Plný tet: v992-07 - PDF Detailed record
	Metody s proměnnou metrikou pro optimalizaci speciálních rozsáhlých nehladkých funkcí Lukšan, Ladislav ; Vlček, Jan In this contribution, we propose a new partitioned variable metric method for minimizing nonsmooth partially separable functions. After a short introduction, the complete algorithm is introduced and some implementation details are given. We prove that this algorithm is globally convergent under standard mild assumptions. Computational experiments given confirm efficiency and robustness of the new method. Detailed record
	Subroutines for Large-Scale Nonlinear Programming Lukšan, Ladislav ; Matonoha, Ctirad ; Vlček, Jan Fulltext: content.csg - PDF Plný tet: v1000-07 - PDF Detailed record

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