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Article Dans Une Revue Journal of Global Optimization Année : 2023

An inertial proximal point method for difference of maximal monotone vector fields in Hadamard manifolds

Résumé

We propose an inertial proximal point method for variational inclusion involving difference of two maximal monotone vector fields in Hadamard manifolds. We prove that if the sequence generated by the method is bounded, then every cluster point is a solution of the non-monotone variational inclusion. Some sufficient conditions for boundedness and full convergence of the sequence are presented. The efficiency of the method is verified by numerical experiments comparing its performance with classical versions of the method for monotone and non-monotone problems.
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Dates et versions

hal-03866947 , version 1 (24-11-2022)

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João S. Andrade, Jurandir de O. Lopes, João Carlos de O. Souza. An inertial proximal point method for difference of maximal monotone vector fields in Hadamard manifolds. Journal of Global Optimization, 2023, 85 (4), pp.941-968. ⟨10.1007/s10898-022-01240-1⟩. ⟨hal-03866947⟩
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