https://orcid.org/0000-0003-1509-1809
References
- Cubiotti P, Yao JC. On the Cauchy problem for a class of differential inclusions with applications. Appl Anal. 2020;99:2543–2554.
- Ansari QH, Islam M, Yao JC. Nonsmooth variational inequalities on Hadamard manifolds. Appl Anal. 2020;99:340–358.
- An NT, Dong PD, Qin X. Robust feature selection via nonconvex sparsity-based methods. J Nonlinear Var Anal. 2021;5:59–77.
- Reich S, Tuyen TM. Two projection algorithms for solving the split common fixed point problem. J Optim Theory Appl. 2020;186:148–168.
- Qin X, An NT. Smoothing algorithms for computing the projection onto a Minkowski sum of convex sets. Comput Optim Appl. 2019;74:821–850.
- Korpelevich GM. The extragradient method for finding saddle points and other problems. Èkonom i Mat Metody. 1976;12:747–756.
- He BS. A class of projection and contraction methods for monotone variational inequalities. Appl Math Optim. 1997;35:69–76.
- Tseng P. A modified forward-backward splitting method for maximal monotone mappings. SIAM J Control Optim. 2000;38:431–446.
- Censor Y, Gibali A, Reich S. The subgradient extragradient method for solving variational inequalities in Hilbert space. J Optim Theory Appl. 2011;148:318–335.
- Tian M, Xu G. Inertial modified Tseng's extragradient algorithms for solving monotone variational inequalities and fixed point problems. J Nonlinear Funct Anal. 2020;2020:Article ID 35.
- Gibali A, Thong DV. A new low-cost double projection method for solving variational inequalities. Optim Eng. 2020;21:1613–1634.
- Shehu Y, Li XH, Dong QL. An efficient projection-type method for monotone variational inequalities in Hilbert spaces. Numer Algorithms. 2020;84:365–388.
- Nguyen LV, Qin X. Some results on strongly pseudomonotone quasi-variational inequalities. Set-Valued Var Anal. 2020;28:239–257.
- Shehu Y, Iyiola OS. Strong convergence result for monotone variational inequalities. Numer Algorithms. 2017;76:259–282.
- Yao Y, Shahzad N, Yao JC. Convergence of Tseng-type self-adaptive algorithms for variational inequalities and fixed point problems. Car J Math. 2021;37:541–550.
- Tan B, Li S. Strong convergence of inertial Mann algorithms for solving hierarchical fixed point problems. J Nonlinear Var Anal. 2020;4:337–355.
- Yao Y, Liou YC, Yao JC. Iterative algorithms for the split variational inequality and fixed point problems under nonlinear transformations. J Nonlinear Sci Appl. 2017;10:843–854.
- Dong QL, Jiang D, Gibali A. A modified subgradient extragradient method for solving the variational inequality problem. Numer Algorithms. 2018;79:927–940.
- Thong DV, Gibali A. Two strong convergence subgradient extragradient methods for solving variational inequalities in Hilbert spaces. Jpn J Ind Appl Math. 2019;36:299–321.
- Gibali A, Thong DV, Tuan PA. Two simple projection-type methods for solving variational inequalities. Anal Math Phys. 2019;9:2203–2225.
- Qin X, Wang L, Yao JC. Inertial splitting method for maximal monotone mappings. J Nonlinear Convex Anal. 2020;21:2325–2333.
- Cui F, Tang Y, Yang Y. An inertial three-operator splitting algorithm with applications to image inpainting. Appl Set-Valued Anal Optim. 2019;1:113–134.
- Shehu Y, Yao JC. Rate of convergence for inertial iterative method for countable family of certain quasi-nonexpansive mappings. J Nonlinear Convex Anal. 2020;21:533–541.
- Shehu Y, Iyiola OS. Projection methods with alternating inertial steps for variational inequalities: weak and linear convergence. Appl Numer Math. 2020;157:315–337.
- Nguyen LV, Qin X. The minimal time function associated with a collection of sets. ESAIM Control Optim Calc Var. 2020;26:93.
- Dong QL, Cho YJ, Zhong LL, et al. Inertial projection and contraction algorithms for variational inequalities. J Global Optim. 2018;70:687–704.
- Thong DV, Vinh NT, Cho YJ. New strong convergence theorem of the inertial projection and contraction method for variational inequality problems. Numer Algorithms. 2020;84:285–305.
- Cholamjiak P, Thong DV, Cho YJ. A novel inertial projection and contraction method for solving pseudomonotone variational inequality problems. Acta Appl Math. 2020;169:217–245.
- Yang J. Self-adaptive inertial subgradient extragradient algorithm for solving pseudomonotone variational inequalities. Appl Anal. 2021;100:1067–1078.
- Shehu Y, Dong QL, Jiang D. Single projection method for pseudo-monotone variational inequality in Hilbert spaces. Optimization. 2019;68:385–409.
- Thong DV, Shehu Y, Iyiola OS, et al. New hybrid projection methods for variational inequalities involving pseudomonotone mappings. Optim Eng. 2021;22:363–386.
- Saejung S, Yotkaew P. Approximation of zeros of inverse strongly monotone operators in Banach spaces. Nonlinear Anal. 2012;75:742–750.
- Vuong PT, Shehu Y. Convergence of an extragradient-type method for variational inequality with applications to optimal control problems. Numer Algorithms. 2019;81:269–291.
- Preininger J, Vuong PT. On the convergence of the gradient projection method for convex optimal control problems with bang-bang solutions. Comput Optim Appl. 2018;70:221–238.
- Pietrus A, Scarinci T, Veliov VM. High order discrete approximations to Mayer's problems for linear systems. SIAM J Control Optim. 2018;56:102–119.
- Bressan B, Piccoli B. Introduction to the mathematical theory of control. San Francisco; American Institute of Mathematical Sciences; 2007.
- Cai G, Gibali A, Iyiola OS. A new double-projection method for solving variational inequalities in Banach spaces. J Optim Theory Appl. 2018;178:219–239.