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Main Authors: Singh, Watanjeet, Chandok, Sumit
Format: Preprint
Published: 2026
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Online Access:https://arxiv.org/abs/2603.17407
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author Singh, Watanjeet
Chandok, Sumit
author_facet Singh, Watanjeet
Chandok, Sumit
contents This paper presents a modified iterative approach to solve the variational inequality problem using the double inertial technique in the context of a real Hilbert space. Our iterative technique involves a projection onto a generalized half-space and a self-adaptive step-size rule which works without prior knowledge of the Lipschitz constant of the operator. We establish a weak convergence result for a variational inequality involving a non-monotone cost operator along with weak and strong convergence results for quasi-monotone and strongly pseudo-monotone operators, respectively. Under a simplified framework, linear convergence of the proposed method is also discussed. Additionally, we provide some numerical experiments to demonstrate the effectiveness of our iterative algorithm compared to previously established algorithms in solving real-world applications. Finally, we carry out a sensitivity analysis of our algorithm to demonstrate its effectiveness across various parameter settings.
format Preprint
id arxiv_https___arxiv_org_abs_2603_17407
institution arXiv
publishDate 2026
record_format arxiv
spellingShingle A modified double inertial subgradient extragradient algorithm for non-monotone variational inequality with applications
Singh, Watanjeet
Chandok, Sumit
Functional Analysis
Optimization and Control
47J20, 47J25
This paper presents a modified iterative approach to solve the variational inequality problem using the double inertial technique in the context of a real Hilbert space. Our iterative technique involves a projection onto a generalized half-space and a self-adaptive step-size rule which works without prior knowledge of the Lipschitz constant of the operator. We establish a weak convergence result for a variational inequality involving a non-monotone cost operator along with weak and strong convergence results for quasi-monotone and strongly pseudo-monotone operators, respectively. Under a simplified framework, linear convergence of the proposed method is also discussed. Additionally, we provide some numerical experiments to demonstrate the effectiveness of our iterative algorithm compared to previously established algorithms in solving real-world applications. Finally, we carry out a sensitivity analysis of our algorithm to demonstrate its effectiveness across various parameter settings.
title A modified double inertial subgradient extragradient algorithm for non-monotone variational inequality with applications
topic Functional Analysis
Optimization and Control
47J20, 47J25
url https://arxiv.org/abs/2603.17407