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1. Stochastic Difference-of-Convex Algorithms for Solving nonconvex optimization problems

Author

An, Le Thi Hoai, Van Ngai, Huynh, Tao, Pham Dinh, and Hau, Luu Hoang Phuc

Subjects
Mathematics - Numerical Analysis, Mathematics - Optimization and Control, 90C30, 90C26, 90C52, 90C15, 90C25, 49M05, 46N10
Abstract

The paper deals with stochastic difference-of-convex functions (DC) programs, that is, optimization problems whose the cost function is a sum of a lower semicontinuous DC function and the expectation of a stochastic DC function with respect to a probability distribution. This class of nonsmooth and nonconvex stochastic optimization problems plays a central role in many practical applications. Although there are many contributions in the context of convex and/or smooth stochastic optimization, algorithms dealing with nonconvex and nonsmooth programs remain rare. In deterministic optimization literature, the DC Algorithm (DCA) is recognized to be one of the few algorithms to solve effectively nonconvex and nonsmooth optimization problems. The main purpose of this paper is to present some new stochastic DCAs for solving stochastic DC programs. The convergence analysis of the proposed algorithms is carefully studied, and numerical experiments are conducted to justify the algorithms' behaviors.

Published
2019

5. Metric Regularity of the Sum of Multifunctions and Applications

Author

Van Ngai, Huynh, Nguyen, Huu Tron, and Thera, Michel

Subjects
Mathematics - Optimization and Control
Abstract

In this work, we use the theory of error bounds to study metric regularity of the sum of two multifunctions, as well as some important properties of variational systems. We use an approach based on the metric regularity of epigraphical multifunctions. Our results subsume some recent results by Durea and Strugariu., Comment: Submitted to JOTA 37 pages

Published
2013

6. Directional metric regularity of multifunctions

Author

Van Ngai, Huynh and Théra, Michel A.

Subjects
Mathematics - Optimization and Control, Mathematics - Classical Analysis and ODEs
Abstract

In this paper, we study relative metric regularity of set-valued mappings with emphasis on directional metric regularity. We establish characterizations of relative metric regularity without assuming the completeness of the image spaces, by using the relative lower semicontinuous envelopes of the distance functions to set-valued mappings. We then apply these characterizations to establish a coderivative type criterion for directional metric regularity as well as for the robustness of metric regularity.

Published
2013

19. Alternating DC algorithm for partial DC programming problems

Author

Van Ngai Huynh, Hoai An Le Thi, Tao Pham Dinh, Vinh Thanh Ho, Laboratoire de Mathématiques de l'INSA de Rouen Normandie (LMI), Institut national des sciences appliquées Rouen Normandie (INSA Rouen Normandie), Institut National des Sciences Appliquées (INSA)-Normandie Université (NU)-Institut National des Sciences Appliquées (INSA)-Normandie Université (NU), Department of Mathematics, University of Quynhon, 170 An Duong Vuong, Qui Nhon, Vietnam, Laboratoire de Génie Informatique, de Production et de Maintenance (LGIPM), and Université de Lorraine (UL)

Subjects
021103 operations research, Control and Optimization, Intersection (set theory), Applied Mathematics, 0211 other engineering and technologies, 010103 numerical & computational mathematics, 02 engineering and technology, Management Science and Operations Research, 01 natural sciences, Critical point (mathematics), Computer Science Applications, Convergence (routing), [INFO]Computer Science [cs], Point (geometry), [MATH]Mathematics [math], 0101 mathematics, Convex function, Algorithm, Robust principal component analysis, ComputingMilieux_MISCELLANEOUS, Dykstra's projection algorithm, Mathematics, Variable (mathematics)
Abstract

DC (Difference of Convex functions) programming and DCA (DC Algorithm) play a key role in nonconvex programming framework. These tools have a rich and successful history of thirty five years of development, and the research in recent years is being increasingly explored to new trends in the development of DCA: design novel DCA variants to improve standard DCA, to deal with the scalability and with broader classes than DC programs. Following these trends, we address in this paper the two wide classes of nonconvex problems, called partial DC programs and generalized partial DC programs, and investigate an alternating approach based on DCA for them. A partial DC program in two variables $$(x,y)\in \mathbb {R}^{n}\times {\mathbb {R}}^{m}$$ takes the form of a standard DC program in each variable while fixing other variable. A so-named alternating DCA and its inexact/generalized versions are developed. The convergence properties of these algorithms are established: both exact and inexact alternating DCA converge to a weak critical point of the considered problem, in particular, when the Kurdyka–Łojasiewicz inequality property is satisfied, the algorithms furnish a Frechet/Clarke critical point. The proposed algorithms are implemented on the problem of finding an intersection point of two nonconvex sets. Numerical experiments are performed on an important application that is robust principal component analysis. Numerical results show the efficiency and the superiority of the alternating DCA comparing with the standard DCA as well as a well known alternating projection algorithm.

Published
2021

22. Generalized Nesterov's accelerated proximal gradient algorithms with convergence rate of order o(1/k2).

Author

Van Ngai, Huynh and Son, Ta Anh

Subjects
FORWARD-backward algorithm, NONSMOOTH optimization, INVERSE problems, CONVEX functions, SMOOTHNESS of functions, ALGORITHMS, MATHEMATICAL regularization
Abstract

The accelerated gradient method initiated by Nesterov is now recognized to be one of the most powerful tools for solving smooth convex optimization problems. This method improves significantly the convergence rate of function values from O(1/k) of the standard gradient method down to O (1 / k 2) . In this paper, we present two generalized variants of Nesterov's accelerated proximal gradient method for solving composition convex optimization problems in which the objective function is represented by the sum of a smooth convex function and a nonsmooth convex part. We show that with suitable ways to pick the sequences of parameters, the convergence rate for the function values of this proposed method is actually of order o (1 / k 2) . Especially, when the objective function is p-uniformly convex for p > 2 , the convergence rate is of order O ln k / k 2 p / (p - 2) , and the convergence is linear if the objective function is strongly convex. By-product, we derive a forward–backward algorithm generalizing the one by Attouch–Peypouquet (SIAM J Optim 26(3):1824–1834, 2016), which produces a convergence sequence with a convergence rate of the function values of order o (1 / k 2) . Initial computational experiments for solving linear inverse problems with the l 1 -regularization demonstrate the capabilities of the proposed algorithms. [ABSTRACT FROM AUTHOR]

Published
2022
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24. Convergence Analysis of Difference-of-Convex Algorithm with Subanalytic Data

Author

Tao Pham Dinh, Van Ngai Huynh, Hoai An Le Thi, Laboratoire de Génie Informatique, de Production et de Maintenance (LGIPM), Université de Lorraine (UL), Department of Mathematics, University of Quynhon, 170 An Duong Vuong, Qui Nhon, Vietnam, Laboratoire de Mathématiques de l'INSA de Rouen Normandie (LMI), Institut national des sciences appliquées Rouen Normandie (INSA Rouen Normandie), and Institut National des Sciences Appliquées (INSA)-Normandie Université (NU)-Institut National des Sciences Appliquées (INSA)-Normandie Université (NU)

Subjects
Control and Optimization, 0211 other engineering and technologies, 02 engineering and technology, Subderivative, Management Science and Operations Research, 01 natural sciences, Subanalyticity, Differentiable function, [MATH]Mathematics [math], 0101 mathematics, Lojasiewicz exponent, Global optimization, Mathematics, 021103 operations research, Applied Mathematics, 010102 general mathematics, Lipschitz continuity, Rate of convergence, Difference-of-Convex algorithm, Convergence rate, Bounded function, Theory of computation, Limit point, Difference-of-Convex programming, Algorithm, Subdifferential
Abstract

International audience; Difference-of-Convex programming and related algorithms, which constitute the backbone of nonconvex programming and global optimization, were introduced in 1985 by Pham Dinh Tao and have been extensively developed by Le Thi Hoai An and Pham Dinh Tao since 1994 to become now classic and increasingly popular. That algorithm is a descent method without linesearch and every limit point of its generated sequence is a critical point of the related Difference-of-Convex program. Determining its convergence rate is a challenging problem. Its knowledge is crucial from both theoretical and practical points of view. In this work, we treat this problem for the class of Difference-of-Convex programs with subanalytic data by using the nonsmooth form of the Lojasiewicz inequality. We have successfully proved that the whole sequence is convergent, if it is bounded, provided that the objective function is subanalytic continuous on its domain and one of the two Difference-of-Convex components is differentiable with locally Lipschitz derivative. We also established a result on the convergence rate, which depended on the Lojasiewicz exponent of the objective function. Finally, for both classes of trust-region subproblems and nonconvex quadratic programs, we showed that the Lojasiewicz exponent was one half, and thereby, our proposed algorithms applied to these Difference-of-Convex programs were Root-linearly convergent.

Published
2018

25. Ekeland's inverse function theorem in graded Fréchet spaces revisited for multifunctions

Author

Van Ngai Huynh and Michel Théra

Subjects
Inverse function theorem, Dominated convergence theorem, Mathematics::Functional Analysis, 021103 operations research, Applied Mathematics, 010102 general mathematics, Mathematical analysis, 0211 other engineering and technologies, 02 engineering and technology, Lebesgue integration, 01 natural sciences, Implicit function theorem, Ekeland's variational principle, symbols.namesake, TheoryofComputation_MATHEMATICALLOGICANDFORMALLANGUAGES, Nash–Moser theorem, Fréchet space, symbols, Inverse function, 0101 mathematics, Analysis, Mathematics
Abstract

In this paper, we present some inverse function theorems and implicit function theorems for set-valued mappings between Frechet spaces. The proof relies on Lebesgue's Dominated Convergence Theorem and on Ekeland's variational principle. An application to the existence of solutions of differential equations in Frechet spaces with non-smooth data is given.

Published
2018

30. Directional Hölder Metric Regularity

Author

Michel Théra, Van Ngai Huynh, Huu Tron Nguyen, Department of Mathematics, Pedagogical University of Quynhon, Pedagogical University of Quynhon, DMI (XLIM-DMI), XLIM (XLIM), Université de Limoges (UNILIM)-Centre National de la Recherche Scientifique (CNRS)-Université de Limoges (UNILIM)-Centre National de la Recherche Scientifique (CNRS), Ministerio de Economıa y Competitividad, NAFOSTED, and LIA 'FormathVietnam'

Subjects
Control and Optimization, Optimization problem, Mathematics::Optimization and Control, 0211 other engineering and technologies, Parameterized complexity, 010103 numerical & computational mathematics, 02 engineering and technology, Management Science and Operations Research, 01 natural sciences, Stability (probability), Slope · Metric regularity · Hölder metric regularity · Generalized equation · Fréchet subdifferential · Asplund spaces · Ekeland variational principle, Sensitivity (control systems), 0101 mathematics, Mathematics - Optimization and Control, Mathematics, Hadamard directional differentiability Mathematics Subject Classification (2000) 49J52, 021103 operations research, 54C60, 47H04, Applied Mathematics, Mathematical analysis, 90C30, Lipschitz continuity, 58C06, Convex metric space, Metric (mathematics), Metric map, [MATH.MATH-OC]Mathematics [math]/Optimization and Control [math.OC], 49J53
Abstract

This paper sheds new light on regularity of multifunctions through various characterizations of directional H\"older /Lipschitz metric regularity, which are based on the concepts of slope and coderivative. By using these characterizations, we show that directional H\"older /Lipschitz metric regularity is stable, when the multifunction under consideration is perturbed suitably. Applications of directional H\"older /Lipschitz metric regularity to investigate the stability and the sensitivity analysis of parameterized optimization problems are also discussed.

Published
2015

31. Metric regularity of composition set-valued mappings: Metric setting and coderivative conditions

Author

Huu Tron Nguyen, Van Ngai Huynh, Radu Strugariu, and Marius Durea

Subjects
Unification, Applied Mathematics, Stability (learning theory), Mathematical proof, Functional Analysis (math.FA), Mathematics - Functional Analysis, Algebra, Set (abstract data type), Metric space, Specialization (logic), Metric (mathematics), FOS: Mathematics, 90C30, 49J52, 49J53, Analysis, Mathematics, Envelope (motion)
Abstract

The paper concerns a new method to obtain a direct proof of the openness at linear rate/metric regularity of composite set-valued maps on metric spaces by the unification and refinement of several methods developed somehow separately in several works of the authors. In fact, this work is a synthesis and a precise specialization to a general situation of some techniques explored in the last years in the literature. In turn, these techniques are based on several important concepts (like error bounds, lower semicontinuous envelope of a set-valued map, local composition stability of multifunctions) and allow us to obtain two new proofs of a recent result having deep roots in the topic of regularity of mappings. Moreover, we make clear the idea that it is possible to use (co)derivative conditions as tools of proof for openness results in very general situations., Comment: 29 pages

Published
2014

32. Preface

Author

Bauschke, Heinz, primary, Burachik, Regina, additional, Van Ngai, Huynh, additional, and Phu, Hoang Xuan, additional

Published
2017
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33. Implicit multifunction theorems in complete metric spaces

Author

Michel Théra, Van Ngai Huynh, Huu Tron Nguyen, Department of Mathematics, Pedagogical University of Quynhon, Pedagogical University of Quynhon, DMI (XLIM-DMI), XLIM (XLIM), and Université de Limoges (UNILIM)-Centre National de la Recherche Scientifique (CNRS)-Université de Limoges (UNILIM)-Centre National de la Recherche Scientifique (CNRS)

Subjects
Perturbation stability, Mathematics::Functional Analysis, Pure mathematics, 021103 operations research, General Mathematics, Numerical analysis, 010102 general mathematics, Mathematical analysis, Mathematics::Optimization and Control, 0211 other engineering and technologies, Perturbation (astronomy), 02 engineering and technology, Contingent derivatives, 01 natural sciences, Computer Science::Other, Metric regularity, Metric space, Generalized equations, 49J52, 49J53, 90C30, Error bound, Implicit multifunction, 0101 mathematics, Software, Mathematics
Abstract

International audience; In this paper, we establish some new characterizations of metric regularity of implicit multifunctions in complete metric spaces by using lower semicontinuous envelopes of the distance functions to set-valued mappings. Through these new characterizations it is possible to investigate implicit multifunction theorems based on coderivatives and on contingent derivatives as well as the perturbation stability of implicit multifunctions.

Published
2013

34. Globally convergent DC trust-region methods

Author

Hoai An Le Thi, Van Ngai Huynh, A. Ismael F. Vaz, Luís Nunes Vicente, Tao Pham Dinh, Laboratoire d'Informatique Théorique et Appliquée (LITA), Université de Lorraine (UL), Department of Mathematics, Pedagogical University of Quynhon, Pedagogical University of Quynhon, Laboratoire de Mathématiques de l'INSA de Rouen Normandie (LMI), Institut national des sciences appliquées Rouen Normandie (INSA Rouen Normandie), Institut National des Sciences Appliquées (INSA)-Normandie Université (NU)-Institut National des Sciences Appliquées (INSA)-Normandie Université (NU), Department of Production and SystemsUniversity of Minho, Braga, Portugal, CMUC, Departamento de Matemática, Universidade de Coimbra, Coimbra - Portugal, and Universidade de Coimbra [Coimbra]

Subjects
Trust region, Mathematical optimization, Control and Optimization, Applied Mathematics, Feasible region, Management Science and Operations Research, Stationary point, Computer Science Applications, Nonlinear programming, Robustness (computer science), [INFO]Computer Science [cs], Convex function, Projection (set theory), Subgradient method, ComputingMilieux_MISCELLANEOUS, Mathematics
Abstract

In this paper, we investigate the use of DC (Difference of Convex functions) models and algorithms in the application of trust-region methods to the solution of a class of nonlinear optimization problems where the constrained set is closed and convex (and, from a practical point of view, where projecting onto the feasible region is computationally affordable). We consider DC local models for the quadratic model of the objective function used to compute the trust-region step, and apply a primal-dual subgradient method to the solution of the corresponding trust-region subproblems. One is able to prove that the resulting scheme is globally convergent to first-order stationary points. The theory requires the use of exact second-order derivatives but, in turn, the computation of the trust-region step asks only for one projection onto the feasible region (in comparison to the calculation of the generalized Cauchy point which may require more). The numerical efficiency and robustness of the proposed new scheme when applied to bound-constrained problems is measured by comparing its performance against some of the current state-of-the-art nonlinear programming solvers on a vast collection of test problems.

Published
2014

35. DC Programming and DCA for General DC Programs

Author

Van Ngai Huynh, Tao Pham Dinh, Hoai An Le Thi, Laboratoire d'Informatique Théorique et Appliquée (LITA), Université de Lorraine (UL), Department of Mathematics, University of Quynhon, 170 An Duong Vuong, Qui Nhon, Vietnam, Laboratoire de Mathématiques de l'INSA de Rouen Normandie (LMI), Institut national des sciences appliquées Rouen Normandie (INSA Rouen Normandie), and Institut National des Sciences Appliquées (INSA)-Normandie Université (NU)-Institut National des Sciences Appliquées (INSA)-Normandie Université (NU)

Subjects
Mathematical optimization, Sequence, 021103 operations research, Karush–Kuhn–Tucker conditions, Concave function, Computer science, Feasible region, 0211 other engineering and technologies, Regular polygon, 010103 numerical & computational mathematics, 02 engineering and technology, Subderivative, Extension (predicate logic), 01 natural sciences, Computer Science::Programming Languages, [INFO]Computer Science [cs], Relaxation (approximation), 0101 mathematics, ComputingMilieux_MISCELLANEOUS
Abstract

We present a natural extension of DC programming and DCA for modeling and solving general DC programs with DC constraints. Two resulting approaches consist in reformulating those programs as standard DC programs in order to use standard DCAs for their solutions. The first one is based on penalty techniques in DC programming, while the second linearizes concave functions in DC constraints to build convex inner approximations of the feasible set. They are proved to converge to KKT points of general DC programs under usual constraints qualifications. Both designed algorithms can be viewed as a sequence of standard DCAs with updated penalty (resp. relaxation) parameters.

Published
2014

36. Block clustering based on difference of convex functions (DC) programming and DC algorithms

Author

Van Ngai Huynh, Hoai Minh Le, Hoai An Le Thi, Tao Pham Dinh, Laboratoire d'Informatique Théorique et Appliquée (LITA), Université de Lorraine (UL), Laboratoire de Mathématiques de l'INSA de Rouen Normandie (LMI), Institut national des sciences appliquées Rouen Normandie (INSA Rouen Normandie), Institut National des Sciences Appliquées (INSA)-Normandie Université (NU)-Institut National des Sciences Appliquées (INSA)-Normandie Université (NU), Department of Mathematics, Pedagogical University of Quynhon, and Pedagogical University of Quynhon

Subjects
Mathematical optimization, Fuzzy clustering, Lung Neoplasms, Databases, Factual, Cognitive Neuroscience, Dc programming, 02 engineering and technology, 01 natural sciences, Biclustering, 010104 statistics & probability, Arts and Humanities (miscellaneous), Fuzzy Logic, Robustness (computer science), Artificial Intelligence, Neoplasms, 0202 electrical engineering, electronic engineering, information engineering, Cluster Analysis, Humans, [INFO]Computer Science [cs], Computer Simulation, 0101 mathematics, ComputingMilieux_MISCELLANEOUS, Problem Solving, Mathematics, Brain Neoplasms, Combinatorial optimization problem, 020201 artificial intelligence & image processing, Standard algorithms, Convex function, Algorithm, Algorithms, Software
Abstract

We investigate difference of convex functions (DC) programming and the DC algorithm (DCA) to solve the block clustering problem in the continuous framework, which traditionally requires solving a hard combinatorial optimization problem. DC reformulation techniques and exact penalty in DC programming are developed to build an appropriate equivalent DC program of the block clustering problem. They lead to an elegant and explicit DCA scheme for the resulting DC program. Computational experiments show the robustness and efficiency of the proposed algorithm and its superiority over standard algorithms such as two-mode K-means, two-mode fuzzy clustering, and block classification EM.

Published
2013

42. GLOBAL ERROR BOUNDS FOR SYSTEMS OF CONVEX POLYNOMIALS OVER POLYHEDRAL CONSTRAINTS.

Author

VAN NGAI, HUYNH

Subjects
*POLYNOMIALS, *POLYHEDRAL functions, *MATHEMATICAL inequalities, *SUBDIFFERENTIALS, *EUCLIDEAN distance, *STOCHASTIC convergence
Abstract

This paper is devoted to studying the Lipschitzian/Hölderian-type global error bound for systems of finitely many convex polynomial inequalities over a polyhedral constraint. First, for systems of this type, we show that under a suitable asymptotic qualification condition the Lipschitzian-type global error bound property is equivalent to the Abadie qualification condition; in particular, the Lipschitzian-type global error bound is satisfied under the Slater condition. Second, without regularity conditions, the Hölderian global error bound with an explicit exponent is investigated. [ABSTRACT FROM AUTHOR]

Published
2015
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43. NEWTON'S METHOD FOR SOLVING INCLUSIONS USING SET-VALUED APPROXIMATIONS.

Author

ADLY, SAMIR, CIBULKA, RADEK, and VAN NGAI, HUYNH

Subjects
NEWTON-Raphson method, APPROXIMATION theory, PERTURBATION theory, STOCHASTIC convergence, ALGORITHMS, MATHEMATICAL mappings
Abstract

Results on stability of both local and global metric regularity under set-valued perturbations are presented. As an application, we study (super)linear convergence of a Newton-type iterative process for solving generalized equations. We investigate several iterative schemes such as the inexact Newton's method, the nonsmooth Newton's method for semismooth functions, the inexact proximal point algorithm, etc. Moreover, we also cover a forward-backward splitting algorithm for finding a zero of the sum of two multivalued (not necessarily monotone) operators. Finally, a globalization of the Newton's method is discussed. [ABSTRACT FROM AUTHOR]

Published
2015
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46. Extensions of Fre´chet ∊-Subdifferential Calculus and Applications

Author

Van Ngai, Huynh, The Luc, Dinh, and Théra, M.

Subjects
*SUBDIFFERENTIALS, *MATHEMATICAL optimization
Abstract

In this paper, we establish some calculus rules for the limiting Fre´chet ∊-subdifferentials of marginal functions and composite functions. Necessary conditions for approximate solutions of a constrained optimization problem are derived. [Copyright &y& Elsevier]

Published
2002
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47. Preface

Author

Heinz H. Bauschke, Regina S. Burachik, Huynh Van Ngai, Hoang Xuan Phu, Bauschke, Heinz, Burachik, Regina, Van Ngai, Huynh, and Phu, Hoang Xuan

Subjects
General Mathematics, Calculus, birthday, Michel's honor, Variational analysis, conference, Mathematics
Abstract

This special issue of the Vietnam Journal of Mathematics is dedicated to Professor Michel Thera on the occasion of his 70th birthday. It follows the successful international conference entitled “New Trends in Optimization and Variational Analysis for Application”, which was organized in Michel’s honor at the University of Quy Nhon on December 7–10, 2016.Due to Michel Th´era’s eminence in mathematics, we received so many high-quality articles of invited experts that we had to divide them into two regular journal issues with more than 400 pages. We would like to thank all authors for their excellent contributions, and all reviewers for their responsible work and constructive comments which did help to improve the submitted manuscripts significantly.

Published
2017

48. Méthode de Newton revisitée pour les équations généralisées

Author

Nguyen, Van Vu, XLIM (XLIM), Université de Limoges (UNILIM)-Centre National de la Recherche Scientifique (CNRS), Université de Limoges, Samir Adly, and Van Ngai Huynh

Subjects
Analyse variationnelle, Linear / superlinear / quadratic convergence, Méthode de Newton sur les variétés Riemaniennes, Régularité métrique, Différenciation multivoque, Riemannian Newton method, Metric regularity, Set-valued differentiation, Convergence linéaire / superlinéaire / quadratique, Generalized equations, Méthode de Josephy-Newton, Josephy-Newton method, Variational analysis, [MATH.MATH-NA]Mathematics [math]/Numerical Analysis [math.NA], Équations généralisées
Abstract

This thesis is devoted to present some results in the scope of Newton-type methods applied for inclusion involving set-valued mappings. In the first part, we follow the Kantorovich's and/or Smale's approaches to study the convergence of Josephy-Newton method for generalized equation (GE) in Banach spaces. Such results can be viewed as an extension of the classical Kantorovich's theorem as well as Smale's (alpha, gamma)-theory which were stated for nonlinear equations. The second part develops an algorithm using set-valued differentiation in order to solve GE. We proved that, under some suitable conditions imposed on the input data and the choice of the starting point, the algorithm produces a sequence converging at least linearly to a solution of considering GE. Moreover, by imposing some stronger assumptions related to the approximation of set-valued part, the proposed method converges locally superlinearly. The last part deals with inclusions involving maps defined on Riemannian manifolds whose values belong to an Euclidean space. Using the relationship between the geometric structure of manifolds and the retraction maps, we show that, our scheme converges locally superlinearly to a solution of the initial problem. With some more regularity assumptions on the data involved in the problem, the quadratic convergence (local and semi-local) can be ensured.; Le but de cette thèse est d'étudier la méthode de Newton pour résoudre numériquement les inclusions variationnelles, appelées aussi dans la littérature les équations généralisées. Ces problèmes engendrent en général des opérateurs multivoques. La première partie est dédiée à l'extension des approches de Kantorovich et la théorie (alpha, gamma) de Smale (connues pour les équations non-linéaires classiques) au cas des inclusions variationnelles dans les espaces de Banach. Ceci a été rendu possible grâce aux développements récents des outils de l'analyse variationnelle et non-lisse tels que la régularité métrique. La seconde partie est consacrée à l'étude de méthodes numériques de type-Newton pour les inclusions variationnelles en utilisant la différentiabilité généralisée d'applications multivoques où nous proposons de linéariser à la fois les parties univoques (lisses) et multivoques (non-lisses). Nous avons montré que, sous des hypothèses sur les données du problème ainsi que le choix du point de départ, la suite générée par la méthode de Newton converge au moins linéairement vers une solution du problème de départ. La convergence superlinéaire peut-être obtenue en imposant plus de conditions sur l'approximation multivaluée. La dernière partie de cette thèse est consacrée à l'étude des équations généralisées dans les variétés Riemaniennes à valeurs dans des espaces euclidiens. Grâce à la relation entre la structure géométrique des variétés et les applications de rétractions, nous montrons que le schéma de Newton converge localement superlinéairement vers une solution du problème. La convergence quadratique (locale et semi-locale) peut-être obtenue avec des hypothèses de régularités sur les données du problème.

Published
2016

49. Bilinear decompositions for the product space H1 X BMO and related problems

Author

Luong, Dang Ky, Mathématiques - Analyse, Probabilités, Modélisation - Orléans (MAPMO), Centre National de la Recherche Scientifique (CNRS)-Université d'Orléans (UO), Université d'Orléans, Sandrine Grellier, Van Ngai Huynh, and STAR, ABES

Subjects
[MATH.MATH-GM]Mathematics [math]/General Mathematics [math.GM], Hardy spaces, Commutator, Schrodinger operator, [MATH.MATH-GM] Mathematics [math]/General Mathematics [math.GM], Ondelettes, Opérateur de Schrodinger, Wavelet, Espaces de Hardy, BMO, Commutateur
Abstract

Voir à la fin du fichier de thèse

Published
2012

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