Sparse convex optimization involves optimization problems where the decision variables are constrained to have a certain number of entries equal to zero. In this paper, we consider the case in which the objective function is decomposed into a sum of different local objective functions and propose a novel fully-distributed scheme to address the problem over a network of cooperating agents. Specifically, by taking advantage of a suitable problem reformulation, we define an Augmented Lagrangian function associated with the reformulated problem. Then, we address such an Augmented Lagrangian by suitably interlacing the Gradient Tracking distributed algorithm and the Block Coordinated Descent method giving rise to a novel fully-distributed scheme. The effectiveness of the proposed algorithm is corroborated through some numerical simulations of problems considering both synthetic and real-world data sets.
A Tracking Augmented Lagrangian Method for ℓ0 Sparse Consensus Optimization / Olama A.; Carnevale G.; Notarstefano G.; Camponogara E.. - ELETTRONICO. - (2023), pp. 2360-2365. (Intervento presentato al convegno 9th International Conference on Control, Decision and Information Technologies, CoDIT 2023 tenutosi a University of Rome La Sapienza, Facolta di lngegneria Civile e lndustriale, ita nel 2023) [10.1109/CoDIT58514.2023.10284260].
A Tracking Augmented Lagrangian Method for ℓ0 Sparse Consensus Optimization
Carnevale G.Secondo
;Notarstefano G.Penultimo
;
2023
Abstract
Sparse convex optimization involves optimization problems where the decision variables are constrained to have a certain number of entries equal to zero. In this paper, we consider the case in which the objective function is decomposed into a sum of different local objective functions and propose a novel fully-distributed scheme to address the problem over a network of cooperating agents. Specifically, by taking advantage of a suitable problem reformulation, we define an Augmented Lagrangian function associated with the reformulated problem. Then, we address such an Augmented Lagrangian by suitably interlacing the Gradient Tracking distributed algorithm and the Block Coordinated Descent method giving rise to a novel fully-distributed scheme. The effectiveness of the proposed algorithm is corroborated through some numerical simulations of problems considering both synthetic and real-world data sets.I documenti in IRIS sono protetti da copyright e tutti i diritti sono riservati, salvo diversa indicazione.
