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On the Primal Feasibility in Dual Decomposition Methods Under Additive and Bounded Errors

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dc.contributor.author Abeynanda, H.
dc.contributor.author Weeraddana, C.
dc.contributor.author Lanel, G. H. J.
dc.contributor.author Fischione, C.
dc.date.accessioned 2023-04-06T10:31:33Z
dc.date.available 2023-04-06T10:31:33Z
dc.date.issued 2022
dc.identifier.citation Abeynanda, H., et al. (2022). On the Primal Feasibility in Dual Decomposition Methods Under Additive and Bounded Errors, IEEE, 2022. en_US
dc.identifier.uri http://dr.lib.sjp.ac.lk/handle/123456789/12717
dc.description.abstract With the unprecedented growth of signal processing and machine learning application domains, there has been a tremendous expansion of interest in distributed optimization methods to cope with the underlying large-scale problems. Nonetheless, inevitable system-specific challenges such as limited computational power, limited communication, latency requirements, measurement errors, and noises in wireless channels impose restrictions on the exactness of the underlying algorithms. Such restrictions have appealed to the exploration of algorithms’ convergence behaviors under inexact settings. Despite the extensive research conducted in the area, it seems that the analysis of convergences of dual decomposition methods concerning primal optimality violations, together with dual optimality violations is less investigated. Here, we provide a systematic exposition of the convergence of feasible points in dual decomposition methods under inexact settings, for an important class of global consensus optimization problems. Convergences and the rate of convergences of the algorithms are mathematically substantiated, not only from a dual-domain standpoint but also from a primaldomain standpoint. Analytical results show that the algorithms converge to a neighborhood of optimality, the size of which depends on the level of underlying distortions. en_US
dc.language.iso en en_US
dc.publisher IEEE en_US
dc.title On the Primal Feasibility in Dual Decomposition Methods Under Additive and Bounded Errors en_US
dc.type Article en_US


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