22 results on '"47H05, 65K05, 90C25"'
Search Results
2. The Proximal Alternating Minimization Algorithm for two-block separable convex optimization problems with linear constraints
- Author
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Bitterlich, Sandy, Bot, Radu Ioan, Csetnek, Ernö Robert, and Wanka, Gert
- Subjects
Mathematics - Optimization and Control ,Mathematics - Numerical Analysis ,47H05, 65K05, 90C25 - Abstract
The Alternating Minimization Algorithm (AMA) has been proposed by Tseng to solve convex programming problems with two-block separable linear constraints and objectives, whereby (at least) one of the components of the latter is assumed to be strongly convex. The fact that one of the subproblems to be solved within the iteration process of AMA does not usually correspond to the calculation of a proximal operator through a closed formula, affects the implementability of the algorithm. In this paper we allow in each block of the objective a further smooth convex function and propose a proximal version of AMA, called Proximal AMA, which is achieved by equipping the algorithm with proximal terms induced by variable metrics. For suitable choices of the latter, the solving of the two subproblems in the iterative scheme can be reduced to the computation of proximal operators. We investigate the convergence of the proposed algorithm in a real Hilbert space setting and illustrate its numerical performances on two applications in image processing and machine learning.
- Published
- 2018
3. ADMM for monotone operators: convergence analysis and rates
- Author
-
Bot, Radu Ioan and Csetnek, Ernö Robert
- Subjects
Mathematics - Optimization and Control ,47H05, 65K05, 90C25 - Abstract
We propose in this paper a unifying scheme for several algorithms from the literature dedicated to the solving of monotone inclusion problems involving compositions with linear continuous operators in infinite dimensional Hilbert spaces. We show that a number of primal-dual algorithms for monotone inclusions and also the classical ADMM numerical scheme for convex optimization problems, along with some of its variants, can be embedded in this unifying scheme. While in the first part of the paper convergence results for the iterates are reported, the second part is devoted to the derivation of convergence rates obtained by combining variable metric techniques with strategies based on suitable choice of dynamical step sizes.
- Published
- 2017
4. Penalty schemes with inertial effects for monotone inclusion problems
- Author
-
Bot, Radu Ioan and Csetnek, Ernö Robert
- Subjects
Mathematics - Optimization and Control ,Mathematics - Functional Analysis ,Mathematics - Numerical Analysis ,47H05, 65K05, 90C25 - Abstract
We introduce a penalty term-based splitting algorithm with inertial effects designed for solving monotone inclusion problems involving the sum of maximally monotone operators and the convex normal cone to the (nonempty) set of zeros of a monotone and Lipschitz continuous operator. We show weak ergodic convergence of the generated sequence of iterates to a solution of the monotone inclusion problem, provided a condition expressed via the Fitzpatrick function of the operator describing the underlying set of the normal cone is verified. Under strong monotonicity assumptions we can even show strong nonergodic convergence of the iterates. This approach constitutes the starting point for investigating from a similar perspective monotone inclusion problems involving linear compositions of parallel-sum operators and, further, for the minimization of a complexly structured convex objective function subject to the set of minima of another convex and differentiable function., Comment: arXiv admin note: text overlap with arXiv:1306.0352
- Published
- 2015
5. Douglas-Rachford Splitting: Complexity Estimates and Accelerated Variants
- Author
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Patrinos, Panagiotis, Stella, Lorenzo, and Bemporad, Alberto
- Subjects
Mathematics - Optimization and Control ,47H05, 65K05, 90C25 - Abstract
We propose a new approach for analyzing convergence of the Douglas-Rachford splitting method for solving convex composite optimization problems. The approach is based on a continuously differentiable function, the Douglas-Rachford Envelope (DRE), whose stationary points correspond to the solutions of the original (possibly nonsmooth) problem. By proving the equivalence between the Douglas-Rachford splitting method and a scaled gradient method applied to the DRE, results from smooth unconstrained optimization are employed to analyze convergence properties of DRS, to tune the method and to derive an accelerated version of it.
- Published
- 2014
6. Backward Penalty Schemes for Monotone Inclusion Problems
- Author
-
Banert, Sebastian and Bot, Radu Ioan
- Subjects
Mathematics - Functional Analysis ,Mathematics - Numerical Analysis ,47H05, 65K05, 90C25 - Abstract
In this paper we are concerned with solving monotone inclusion problems expressed by the sum of a set-valued maximally monotone operator with a single-valued maximally monotone one and the normal cone to the nonempty set of zeros of another set-valued maximally monotone operator. Depending on the nature of the single-valued operator, we will propose two iterative penalty schemes, both addressing the set-valued operators via backward steps. The single-valued operator will be evaluated via a single forward step if it is cocoercive, and via two forward steps if it is monotone and Lipschitz continuous. The latter situation represents the starting point for dealing with complexly structured monotone inclusion problems from algorithmic point of view., Comment: arXiv admin note: text overlap with arXiv:1306.0352
- Published
- 2014
7. A hybrid proximal-extragradient algorithm with inertial effects
- Author
-
Bot, Radu Ioan and Csetnek, Ernö Robert
- Subjects
Mathematics - Functional Analysis ,Mathematics - Numerical Analysis ,Mathematics - Optimization and Control ,47H05, 65K05, 90C25 - Abstract
We incorporate inertial terms in the hybrid proximal-extragradient algorithm and investigate the convergence properties of the resulting iterative scheme designed for finding the zeros of a maximally monotone operator in real Hilbert spaces. The convergence analysis relies on extended Fej\'er monotonicity techniques combined with the celebrated Opial Lemma. We also show that the classical hybrid proximal-extragradient algorithm and the inertial versions of the proximal point, the forward-backward and the forward-backward-forward algorithms can be embedded in the framework of the proposed iterative scheme.
- Published
- 2014
8. An inertial alternating direction method of multipliers
- Author
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Bot, Radu Ioan and Csetnek, Ernö Robert
- Subjects
Mathematics - Optimization and Control ,Mathematics - Numerical Analysis ,47H05, 65K05, 90C25 - Abstract
In the context of convex optimization problems in Hilbert spaces, we induce inertial effects into the classical ADMM numerical scheme and obtain in this way so-called inertial ADMM algorithms, the convergence properties of which we investigate into detail. To this aim we make use of the inertial version of the Douglas-Rachford splitting method for monotone inclusion problems recently introduced in [12], in the context of concomitantly solving a convex minimization problem and its Fenchel dual. The convergence of both sequences of the generated iterates and of the objective function values is addressed. We also show how the obtained results can be extended to the treating of convex minimization problems having as objective a finite sum of convex functions.
- Published
- 2014
9. Inertial Douglas-Rachford splitting for monotone inclusion problems
- Author
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Bot, Radu Ioan, Csetnek, Ernö Robert, and Hendrich, Christopher
- Subjects
Mathematics - Optimization and Control ,Mathematics - Functional Analysis ,Mathematics - Numerical Analysis ,47H05, 65K05, 90C25 - Abstract
We propose an inertial Douglas-Rachford splitting algorithm for finding the set of zeros of the sum of two maximally monotone operators in Hilbert spaces and investigate its convergence properties. To this end we formulate first the inertial version of the Krasnosel'ski\u{\i}--Mann algorithm for approximating the set of fixed points of a nonexpansive operator, for which we also provide an exhaustive convergence analysis. By using a product space approach we employ these results to the solving of monotone inclusion problems involving linearly composed and parallel-sum type operators and provide in this way iterative schemes where each of the maximally monotone mappings is accessed separately via its resolvent. We consider also the special instance of solving a primal-dual pair of nonsmooth convex optimization problems and illustrate the theoretical results via some numerical experiments in clustering and location theory., Comment: arXiv admin note: text overlap with arXiv:1402.5291
- Published
- 2014
10. An inertial forward-backward-forward primal-dual splitting algorithm for solving monotone inclusion problems
- Author
-
Bot, Radu Ioan and Csetnek, Ernö Robert
- Subjects
Mathematics - Optimization and Control ,Mathematics - Functional Analysis ,47H05, 65K05, 90C25 - Abstract
We introduce and investigate the convergence properties of an inertial forward-backward-forward splitting algorithm for approaching the set of zeros of the sum of a maximally monotone operator and a single-valued monotone and Lipschitzian operator. By making use of the product space approach, we expand it to the solving of inclusion problems involving mixtures of linearly composed and parallel-sum type monotone operators. We obtain in this way an inertial forward-backward-forward primal-dual splitting algorithm having as main characteristic the fact that in the iterative scheme all operators are accessed separately either via forward or via backward evaluations. We present also the variational case when one is interested in the solving of a primal-dual pair of convex optimization problems with intricate objective functions., Comment: arXiv admin note: text overlap with arXiv:1303.2875
- Published
- 2014
11. Forward-Backward and Tseng's Type Penalty Schemes for Monotone Inclusion Problems
- Author
-
Bot, Radu Ioan and Csetnek, Ernö Robert
- Subjects
Mathematics - Functional Analysis ,Mathematics - Optimization and Control ,47H05, 65K05, 90C25 - Abstract
We deal with monotone inclusion problems of the form $0\in Ax+Dx+N_C(x)$ in real Hilbert spaces, where $A$ is a maximally monotone operator, $D$ a cocoercive operator and $C$ the nonempty set of zeros of another cocoercive operator. We propose a forward-backward penalty algorithm for solving this problem which extends the one proposed by H. Attouch, M.-O. Czarnecki and J. Peypouquet in [3]. The condition which guarantees the weak ergodic convergence of the sequence of iterates generated by the proposed scheme is formulated by means of the Fitzpatrick function associated to the maximally monotone operator that describes the set $C$. In the second part we introduce a forward-backward-forward algorithm for monotone inclusion problems having the same structure, but this time by replacing the cocoercivity hypotheses with Lipschitz continuity conditions. The latter penalty type algorithm opens the gate to handle monotone inclusion problems with more complicated structures, for instance, involving compositions of maximally monotone operators with linear continuous ones., Comment: 18 pages
- Published
- 2013
12. On the convergence rate improvement of a primal-dual splitting algorithm for solving monotone inclusion problems
- Author
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Bot, Radu Ioan, Csetnek, Ernö Robert, and Heinrich, Andre
- Subjects
Mathematics - Optimization and Control ,Mathematics - Numerical Analysis ,47H05, 65K05, 90C25 - Abstract
We present two modified versions of the primal-dual splitting algorithm relying on forward-backward splitting proposed in \cite{vu} for solving monotone inclusion problems. Under strong monotonicity assumptions for some of the operators involved we obtain for the sequences of iterates that approach the solution orders of convergence of O(1/n) and O(\omega^n), for $\omega \in (0,1)$, respectively. The investigated primal-dual algorithms are fully decomposable, in the sense that the operators are processed individually at each iteration. We also discuss the modified algorithms in the context of convex optimization problems and present numerical experiments in image processing and support vector machines classification., Comment: 24 pages
- Published
- 2013
13. A primal-dual splitting algorithm for finding zeros of sums of maximally monotone operators
- Author
-
Bot, Radu Ioan, Csetnek, Ernö Robert, and Heinrich, Andre
- Subjects
Mathematics - Optimization and Control ,Mathematics - Numerical Analysis ,47H05, 65K05, 90C25 - Abstract
We consider the primal problem of finding the zeros of the sum of a maximally monotone operator with the composition of another maximally monotone operator with a linear continuous operator and a corresponding dual problem formulated by means of the inverse operators. A primal-dual splitting algorithm which simultaneously solves the two problems in finite-dimensional spaces is presented. The scheme uses at each iteration separately the resolvents of the maximally monotone operators involved and it gives rise to a splitting algorithm for finding the zeros of the sum of compositions of maximally monotone operators with linear continuous operators. The iterative schemes are used for solving nondifferentiable convex optimization problems arising in image processing and in location theory., Comment: 24 pages, 5 figures
- Published
- 2012
14. A Monotone+Skew Splitting Model for Composite Monotone Inclusions in Duality
- Author
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Briceno-Arias, L. and Combettes, P. L.
- Subjects
Mathematics - Optimization and Control ,47H05, 65K05, 90C25 - Abstract
The principle underlying this paper is the basic observation that the problem of simultaneously solving a large class of composite monotone inclusions and their duals can be reduced to that of finding a zero of the sum of a maximally monotone operator and a linear skew-adjoint operator. An algorithmic framework is developed for solving this generic problem in a Hilbert space setting. New primal-dual splitting algorithms are derived from this framework for inclusions involving composite monotone operators, and convergence results are established. These algorithms draw their simplicity and efficacy from the fact that they operate in a fully decomposed fashion in the sense that the monotone operators and the linear transformations involved are activated separately at each iteration. Comparisons with existing methods are made and applications to composite variational problems are demonstrated.
- Published
- 2010
15. Penalty schemes with inertial effects for monotone inclusion problems
- Author
-
Ernö Robert Csetnek and Radu Ioan Boţ
- Subjects
TheoryofComputation_MISCELLANEOUS ,Control and Optimization ,0211 other engineering and technologies ,02 engineering and technology ,Subderivative ,Management Science and Operations Research ,01 natural sciences ,Pseudo-monotone operator ,FOS: Mathematics ,Applied mathematics ,Mathematics - Numerical Analysis ,Differentiable function ,0101 mathematics ,Convex conjugate ,Mathematics - Optimization and Control ,Mathematics ,Discrete mathematics ,021103 operations research ,Applied Mathematics ,010102 general mathematics ,Numerical Analysis (math.NA) ,Strongly monotone ,Lipschitz continuity ,Functional Analysis (math.FA) ,47H05, 65K05, 90C25 ,Mathematics - Functional Analysis ,Monotone polygon ,Optimization and Control (math.OC) ,Iterated function - Abstract
We introduce a penalty term-based splitting algorithm with inertial effects designed for solving monotone inclusion problems involving the sum of maximally monotone operators and the convex normal cone to the (nonempty) set of zeros of a monotone and Lipschitz continuous operator. We show weak ergodic convergence of the generated sequence of iterates to a solution of the monotone inclusion problem, provided a condition expressed via the Fitzpatrick function of the operator describing the underlying set of the normal cone is verified. Under strong monotonicity assumptions we can even show strong nonergodic convergence of the iterates. This approach constitutes the starting point for investigating from a similar perspective monotone inclusion problems involving linear compositions of parallel-sum operators and, further, for the minimization of a complexly structured convex objective function subject to the set of minima of another convex and differentiable function., arXiv admin note: text overlap with arXiv:1306.0352
- Published
- 2016
- Full Text
- View/download PDF
16. The Proximal Alternating Minimization Algorithm for Two-Block Separable Convex Optimization Problems with Linear Constraints
- Author
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Radu Ioan Boţ, Ernö Robert Csetnek, Sandy Bitterlich, and Gert Wanka
- Subjects
Mathematical optimization ,Control and Optimization ,Computation ,0211 other engineering and technologies ,65K05 ,010103 numerical & computational mathematics ,02 engineering and technology ,Subderivative ,Management Science and Operations Research ,01 natural sciences ,Article ,90C25 ,Separable space ,symbols.namesake ,Fenchel duality ,Operator (computer programming) ,FOS: Mathematics ,Proximal AMA ,Lagrangian ,Saddle points ,Subdifferential ,Convex optimization ,Mathematics - Numerical Analysis ,0101 mathematics ,Mathematics - Optimization and Control ,Mathematics ,021103 operations research ,47H05 ,Applied Mathematics ,Hilbert space ,Numerical Analysis (math.NA) ,47H05, 65K05, 90C25 ,Optimization and Control (math.OC) ,Theory of computation ,symbols ,Convex function - Abstract
The Alternating Minimization Algorithm has been proposed by Paul Tseng to solve convex programming problems with two-block separable linear constraints and objectives, whereby (at least) one of the components of the latter is assumed to be strongly convex. The fact that one of the subproblems to be solved within the iteration process of this method does not usually correspond to the calculation of a proximal operator through a closed formula affects the implementability of the algorithm. In this paper, we allow in each block of the objective a further smooth convex function and propose a proximal version of the algorithm, which is achieved by equipping the algorithm with proximal terms induced by variable metrics. For suitable choices of the latter, the solving of the two subproblems in the iterative scheme can be reduced to the computation of proximal operators. We investigate the convergence of the proposed algorithm in a real Hilbert space setting and illustrate its numerical performances on two applications in image processing and machine learning. peerReviewed
- Published
- 2018
17. ADMM for monotone operators: convergence analysis and rates
- Author
-
Radu Ioan Bot and Ernö Robert Csetnek
- Subjects
Context (language use) ,010103 numerical & computational mathematics ,Subderivative ,01 natural sciences ,Fenchel duality ,symbols.namesake ,Primal-dual algorithm ,Monotone operators ,Convergence (routing) ,FOS: Mathematics ,Applied mathematics ,0101 mathematics ,ADMM algorithm ,Mathematics - Optimization and Control ,Mathematics ,Applied Mathematics ,Hilbert space ,47H05, 65K05, 90C25 ,010101 applied mathematics ,Computational Mathematics ,Monotone polygon ,Subdifferential Convex optimization ,Iterated function ,Optimization and Control (math.OC) ,Metric (mathematics) ,Convex optimization ,symbols - Abstract
We propose in this paper a unifying scheme for several algorithms from the literature dedicated to the solving of monotone inclusion problems involving compositions with linear continuous operators in infinite dimensional Hilbert spaces. We show that a number of primal-dual algorithms for monotone inclusions and also the classical ADMM numerical scheme for convex optimization problems, along with some of its variants, can be embedded in this unifying scheme. While in the first part of the paper, convergence results for the iterates are reported, the second part is devoted to the derivation of convergence rates obtained by combining variable metric techniques with strategies based on suitable choice of dynamical step sizes. The numerical performances, which can be obtained for different dynamical step size strategies, are compared in the context of solving an image denoising problem.
- Published
- 2017
- Full Text
- View/download PDF
18. Douglas-rachford splitting: Complexity estimates and accelerated variants
- Author
-
Panagiotis Patrinos, Alberto Bemporad, and Lorenzo Stella
- Subjects
Mathematical optimization ,Mathematics::Optimization and Control ,Regular polygon ,Unconstrained optimization ,Function (mathematics) ,Stationary point ,47H05, 65K05, 90C25 ,Optimization and Control (math.OC) ,Convergence (routing) ,FOS: Mathematics ,Applied mathematics ,Envelope (mathematics) ,Mathematics - Optimization and Control ,Gradient method ,Equivalence (measure theory) ,Mathematics - Abstract
We propose a new approach for analyzing convergence of the Douglas-Rachford splitting method for solving convex composite optimization problems. The approach is based on a continuously differentiable function, the Douglas-Rachford Envelope (DRE), whose stationary points correspond to the solutions of the original (possibly nonsmooth) problem. By proving the equivalence between the Douglas-Rachford splitting method and a scaled gradient method applied to the DRE, results from smooth unconstrained optimization are employed to analyze convergence properties of DRS, to tune the method and to derive an accelerated version of it.
- Published
- 2014
- Full Text
- View/download PDF
19. Backward Penalty Schemes for Monotone Inclusion Problems
- Author
-
Radu Ioan Boţ and Sebastian Banert
- Subjects
Discrete mathematics ,TheoryofComputation_MISCELLANEOUS ,Control and Optimization ,Applied Mathematics ,Monotonic function ,Numerical Analysis (math.NA) ,Management Science and Operations Research ,Lipschitz continuity ,Strongly monotone ,Functional Analysis (math.FA) ,47H05, 65K05, 90C25 ,Mathematics - Functional Analysis ,Pseudo-monotone operator ,Operator (computer programming) ,Monotone polygon ,Theory of computation ,FOS: Mathematics ,Mathematics - Numerical Analysis ,Bernstein's theorem on monotone functions ,Mathematics - Abstract
In this paper we are concerned with solving monotone inclusion problems expressed by the sum of a set-valued maximally monotone operator with a single-valued maximally monotone one and the normal cone to the nonempty set of zeros of another set-valued maximally monotone operator. Depending on the nature of the single-valued operator, we will propose two iterative penalty schemes, both addressing the set-valued operators via backward steps. The single-valued operator will be evaluated via a single forward step if it is cocoercive, and via two forward steps if it is monotone and Lipschitz continuous. The latter situation represents the starting point for dealing with complexly structured monotone inclusion problems from algorithmic point of view., arXiv admin note: text overlap with arXiv:1306.0352
- Published
- 2014
20. A hybrid proximal-extragradient algorithm with inertial effects
- Author
-
Ernö Robert Csetnek and Radu Ioan Boţ
- Subjects
TheoryofComputation_MISCELLANEOUS ,Lemma (mathematics) ,Control and Optimization ,Inertial frame of reference ,Hilbert space ,Monotonic function ,Numerical Analysis (math.NA) ,Computer Science Applications ,Functional Analysis (math.FA) ,47H05, 65K05, 90C25 ,Proximal point ,Mathematics - Functional Analysis ,symbols.namesake ,Optimization and Control (math.OC) ,Scheme (mathematics) ,Signal Processing ,Convergence (routing) ,symbols ,FOS: Mathematics ,Mathematics - Numerical Analysis ,Algorithm ,Mathematics - Optimization and Control ,Analysis ,Resolvent ,Mathematics - Abstract
In this article, we incorporate inertial terms in the hybrid proximal-extragradient algorithm and investigate the convergence properties of the resulting iterative scheme designed to find the zeros of a maximally monotone operator in real Hilbert spaces. The convergence analysis relies on extended Fejer monotonicity techniques combined with the celebrated Opial Lemma. We also show that the classical hybrid proximal-extragradient algorithm and the inertial versions of the proximal point, the forward-backward and the forward-backward-forward algorithms can be embedded into the framework of the proposed iterative scheme.
- Published
- 2014
- Full Text
- View/download PDF
21. An inertial forward-backward-forward primal-dual splitting algorithm for solving monotone inclusion problems
- Author
-
Ernö Robert Csetnek and Radu Ioan Boţ
- Subjects
TheoryofComputation_MISCELLANEOUS ,Mathematical optimization ,021103 operations research ,Applied Mathematics ,0211 other engineering and technologies ,010103 numerical & computational mathematics ,02 engineering and technology ,Subderivative ,Strongly monotone ,01 natural sciences ,Functional Analysis (math.FA) ,47H05, 65K05, 90C25 ,Mathematics - Functional Analysis ,Pseudo-monotone operator ,Operator (computer programming) ,Monotone polygon ,Optimization and Control (math.OC) ,Convex optimization ,Theory of computation ,Convergence (routing) ,FOS: Mathematics ,0101 mathematics ,Mathematics - Optimization and Control ,Algorithm ,Mathematics - Abstract
We introduce and investigate the convergence properties of an inertial forward-backward-forward splitting algorithm for approaching the set of zeros of the sum of a maximally monotone operator and a single-valued monotone and Lipschitzian operator. By making use of the product space approach, we expand it to the solving of inclusion problems involving mixtures of linearly composed and parallel-sum type monotone operators. We obtain in this way an inertial forward-backward-forward primal-dual splitting algorithm having as main characteristic the fact that in the iterative scheme all operators are accessed separately either via forward or via backward evaluations. We present also the variational case when one is interested in the solving of a primal-dual pair of convex optimization problems with intricate objective functions., Comment: arXiv admin note: text overlap with arXiv:1303.2875
- Published
- 2014
- Full Text
- View/download PDF
22. A Monotone+Skew Splitting Model for Composite Monotone Inclusions in Duality
- Author
-
Luis M. Briceño-Arias, Patrick L. Combettes, Laboratoire Jacques-Louis Lions (LJLL), Université Pierre et Marie Curie - Paris 6 (UPMC)-Université Paris Diderot - Paris 7 (UPD7)-Centre National de la Recherche Scientifique (CNRS), Centre de modélisation mathématique (CMM), Universitad de Chile-Centre National de la Recherche Scientifique (CNRS), and Université Pierre et Marie Curie - Paris 6 (UPMC)
- Subjects
minimization algorithm ,Secondary ,convex optimization ,0211 other engineering and technologies ,Duality (optimization) ,65K05 ,010103 numerical & computational mathematics ,02 engineering and technology ,01 natural sciences ,90C25 ,Theoretical Computer Science ,Combinatorics ,symbols.namesake ,Pseudo-monotone operator ,monotone inclu-sion ,Operator (computer programming) ,FOS: Mathematics ,Applied mathematics ,0101 mathematics ,Mathematics - Optimization and Control ,Bernstein's theorem on monotone functions ,Mathematics ,021103 operations research ,decomposition ,47H05 ,Hilbert space ,Fenchel– Rockafellar duality ,Strongly monotone ,47H05, 65K05, 90C25 ,Linear map ,Monotone polygon ,forward-backward-forward algorithm ,Optimization and Control (math.OC) ,monotone operator ,symbols ,duality ,composite operator ,operator splitting AMS subject classifications Primary ,[MATH.MATH-OC]Mathematics [math]/Optimization and Control [math.OC] ,Software - Abstract
International audience; The principle underlying this paper is the basic observation that the problem of simultaneously solving a large class of composite monotone inclusions and their duals can be reduced to that of finding a zero of the sum of a maximally monotone operator and a linear skew-adjoint operator. An algorithmic framework is developed for solving this generic problem in a Hilbert space setting. New primal-dual splitting algorithms are derived from this framework for inclusions involving composite monotone operators, and convergence results are established. These algorithms draw their simplicity and efficacy from the fact that they operate in a fully decomposed fashion in the sense that the monotone operators and the linear transformations involved are activated separately at each iteration. Comparisons with existing methods are made and applications to composite variational problems are demonstrated.
- Published
- 2011
- Full Text
- View/download PDF
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