Inexact penalty decomposition methods for optimization problems with geometric constraints

Kanzow, Christian; Lapucci, Matteo

doi:10.1007/s10589-023-00475-2

Cited by 3 publications

(2 citation statements)

References 67 publications

(157 reference statements)

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“…In conclusion, similarly as what was shown for the case of cardinality constrained problems [16,17], we have basically proved here that the PD scheme can be employed, with no loss of convergence guarantees, solving the subproblems by inexact AM; this result also justifies the use of the PD method in the very common settings where the function f is not convex.…”

Section: Inexact Penalty Decompositionsupporting

confidence: 83%

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On the Convergence of Inexact Alternate Minimization in Problems with ℓ0 Penalties

Lapucci,

Sortino

2024

Preprint

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In this work, we consider unconstrained nonlinear optimization problems where the objective function presents a penalty term on the cardinality of a subset of the variables vector; specifically, we prove that an alternate minimization scheme has global asymptotic convergence guarantees towards points satisfying first order optimality conditions, even when the optimization step with respect to one of the blocks of variables is inexact and without introducing proximal terms. This result, supported by numerical evidence, justifies the use of pure alternate minimization in applications, even in absence of convexity assumptions. Mathematics Subject Classification (2020) 90C26 · 90C30

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Section: Inexact Penalty Decompositionsupporting

confidence: 83%

“…We can note that the unconstrained minimization of function ( 3) perfectly fits the framework (1) considered in this work: function [16,17] and y-update subproblem can be solved in closed form up to global optimality [19].…”

Section: Inexact Penalty Decompositionmentioning

confidence: 73%

On the Convergence of Inexact Alternate Minimization in Problems with ℓ0 Penalties

Lapucci,

Sortino

2024

Preprint

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Cardinality-Constrained Multi-objective Optimization: Novel Optimality Conditions and Algorithms

Lapucci,

Mansueto

2024

J Optim Theory Appl

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In this paper, we consider multi-objective optimization problems with a sparsity constraint on the vector of variables. For this class of problems, inspired by the homonymous necessary optimality condition for sparse single-objective optimization, we define the concept of L-stationarity and we analyze its relationships with other existing conditions and Pareto optimality concepts. We then propose two novel algorithmic approaches: the first one is an iterative hard thresholding method aiming to find a single L-stationary solution, while the second one is a two-stage algorithm designed to construct an approximation of the whole Pareto front. Both methods are characterized by theoretical properties of convergence to points satisfying necessary conditions for Pareto optimality. Moreover, we report numerical results establishing the practical effectiveness of the proposed methodologies.

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On the Convergence of Inexact Alternate Minimization in Problems with $$\ell _0$$ Penalties

Lapucci,

Sortino

2024

Oper. Res. Forum

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Inexact penalty decomposition methods for optimization problems with geometric constraints

Cited by 3 publications

References 67 publications

On the Convergence of Inexact Alternate Minimization in Problems with ℓ0 Penalties

On the Convergence of Inexact Alternate Minimization in Problems with ℓ0 Penalties

Cardinality-Constrained Multi-objective Optimization: Novel Optimality Conditions and Algorithms

On the Convergence of Inexact Alternate Minimization in Problems with $$\ell _0$$ Penalties

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