Optimality Conditions and Constraint Qualifications for Generalized Nash Equilibrium Problems and Their Practical Implications

Bueno, Luis; Haeser, Gabriel; Rojas, Frank Navarro

doi:10.1137/17m1162524

Cited by 24 publications

(16 citation statements)

References 33 publications

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“…Actually, we have also not established this result in the first publicly available version of this paper, although it is a natural consequence of our theory. Very recently, and citing this earlier version, Bueno, Haeser and Rojas reported this fact in a more general context, namely, of the generalized Nash equilibrium problems (see [16,Theorem 6.3]). In this sense, it is not the first time that Corollary 4.3 appears in the literature.…”

Section: Boundedness Of the Dual Sequences Generated By The Methodsmentioning

confidence: 88%

“…according to [15]. In this paper, we only deal with the augmented Lagrangian (1) (and then we always have (16)), but we note that the general form (15) is also appropriate for the case when a non-quadratic penalty augmented Lagrangian function is employed, as in [18,29]. It is known that when Algorithm 1 does not stop by failure, it generates an AKKT sequence for the problem (P) if its limit point is feasible (see [15]).…”

Section: Relations Between Pakkt-regular and Other Known Cqsmentioning

confidence: 99%

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A Sequential Optimality Condition Related to the Quasi-normality Constraint Qualification and Its Algorithmic Consequences

Andreani¹,

Fazzio²,

Schuverdt³

et al. 2019

SIAM J. Optim.

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In the present paper, we prove that the augmented Lagrangian method converges to KKT points under the quasinormality constraint qualification, which is associated with the external penalty theory. An interesting consequence is that the Lagrange multipliers estimates computed by the method remain bounded in the presence of the quasinormality condition. In order to establish a more general convergence result, a new sequential optimality condition for smooth constrained optimization, called PAKKT, is defined. The new condition takes into account the sign of the dual sequence, constituting an adequate sequential counterpart to the (enhanced) Fritz-John necessary optimality conditions proposed by Hestenes, and later extensively treated by Bertsekas. PAKKT points are substantially better than points obtained by the classical Approximate KKT (AKKT) condition, which has been used to establish theoretical convergence results for several methods. In particular, we present a simple problem with complementarity constraints such that all its feasible points are AKKT, while only the solutions and a pathological point are PAKKT. This shows the efficiency of the methods that reach PAKKT points, particularly the augmented Lagrangian algorithm, in such problems. We also provided the appropriate strict constraint qualification associated with the PAKKT sequential optimality condition, called PAKKT-regular, and we prove that it is strictly weaker than both quasinormality and cone continuity property. PAKKT-regular connects both branches of these independent constraint qualifications, generalizing all previous theoretical convergence results for the augmented Lagrangian method in the literature.where f : R n → R and X is the feasible set composed of equality and inequality constraints of the form X = {x | h(x) = 0, g(x) ≤ 0}, * This work has been partially supported by CEPID-CeMEAI (FAPESP 2013/07375-0), FAPESP (Grant 2013/05475-7) and CNPq (Grant 303013/2013-3).

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Section: Boundedness Of the Dual Sequences Generated By The Methodsmentioning

confidence: 88%

Section: Relations Between Pakkt-regular and Other Known Cqsmentioning

confidence: 99%

A Sequential Optimality Condition Related to the Quasi-normality Constraint Qualification and Its Algorithmic Consequences

Andreani¹,

Fazzio²,

Schuverdt³

et al. 2019

SIAM J. Optim.

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“…For NLPs it has been shown that this variant possesses strong convergence properties even under very mild assumptions [4,6]. It has since been applied to solve various other problems, including MPCC [7,26], quasi-variational inequalities [27], generalized Nash equilibrium problems [16,29], and semidefinite programming [8,14].…”

Section: Introductionmentioning

confidence: 99%

An Augmented Lagrangian Method for Cardinality-Constrained Optimization Problems

Kanzow

Raharja

Schwartz

2021

J Optim Theory Appl

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A reformulation of cardinality-constrained optimization problems into continuous nonlinear optimization problems with an orthogonality-type constraint has gained some popularity during the last few years. Due to the special structure of the constraints, the reformulation violates many standard assumptions and therefore is often solved using specialized algorithms. In contrast to this, we investigate the viability of using a standard safeguarded multiplier penalty method without any problem-tailored modifications to solve the reformulated problem. We prove global convergence towards an (essentially strongly) stationary point under a suitable problem-tailored quasinormality constraint qualification. Numerical experiments illustrating the performance of the method in comparison to regularization-based approaches are provided.

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“…La literatura sobre estos dos tipo de problemas asi como para EPs es amplia tanto desde el punto de vista de existencia y unicidad de soluciones, de algoritmos para hallar soluciones y de modelaje de problemas que surgen en diferentesáreas, para QVIs ver por ejemplo [9,27,18] y referencias, para GNEPs [17,16,15,14,7] y referencias, para EPs [30,33,32,6,31] y referencias. Entanto el estudio de QEP ha recibido menos atención en comparación con los problemas antes mencionados, esto puede ser debido a la complejidad y generalidad de su formulación y de aun no encontrarse suficientes problemas aplicativos que puedan ser modelados estrictamente por QEPs, y que no puedan ser modelados por algun problema que sea un caso particular de un QEP.…”

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Analytical solution of quasi-equilibrium problems in one variable

Navarro

2020

Sel.mat

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Optimality Conditions and Constraint Qualifications for Generalized Nash Equilibrium Problems and Their Practical Implications

Cited by 24 publications

References 33 publications

A Sequential Optimality Condition Related to the Quasi-normality Constraint Qualification and Its Algorithmic Consequences

A Sequential Optimality Condition Related to the Quasi-normality Constraint Qualification and Its Algorithmic Consequences

An Augmented Lagrangian Method for Cardinality-Constrained Optimization Problems

Analytical solution of quasi-equilibrium problems in one variable

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