Advanced search
Publication Cover
Applicable Analysis
An International Journal
Volume 102, 2023 - Issue 2
Submit an article Journal homepage
244
Views
2
CrossRef citations to date
0
Altmetric
Research Article

Variational inequalities governed by strongly pseudomonotone vector fields on Hadamard manifolds

Luong Van Nguyena Faculty of Natural Sciences, Hong Duc University, Thanh Hoa, VietnamView further author information
,
Nguyen Thi Thua Faculty of Natural Sciences, Hong Duc University, Thanh Hoa, VietnamView further author information
&
Nguyen Thai Anb Department of Mathematics, College of Education, Hue University, Hue City, VietnamCorrespondence[email protected]
View further author information
Pages 444-467 | Received 23 Apr 2021, Accepted 06 Jul 2021, Published online: 16 Aug 2021

References

  • Li C, Lopez G, Martin-Maquez V. Monotone vector fields and the proximal point algorithm on Hadamard manifolds. J London Math Soc. 2009;79:663–683.
  • Németh SZ. Monotone vector fields. Publ Math. 1999;54:437–449.
  • Németh SZ. Geodesic monotone vector fields. Lobachev J Math. 1999;5:13–28.
  • Wang JH, Lopez G, Martin-Marquez V, et al. Monotone and accretive vector fields on Riemannian manifolds. J Optim Theory Appl. 2010;146:691–708.
  • Azagra D, Ferrera J, López-Mesas M. Nonsmooth analysis and Hamilton-Jacobi equations on Riemannian manifolds. J Funct Anal. 2005;220:304–361.
  • Hosseini S, Pouryayevali MR. Generalized gradients and characterizations of epi-Lipschitz sets in Riemannian manifolds. Nonlinear Anal. 2011;74:3884–3895.
  • Ledyaev YS, Zhu QJ. Nonsmooth analysis on smooth manifolds. Trans Am Math Soc. 2007;359:3687–3732.
  • Al-Homidan S, Ansari QH, Islam M. Browder type fixed point theorem on Hadamard manifolds with applications. J Nonlinear Convex Anal. 2019;20:2397–2410.
  • Ansari QH, Islam M, Yao J-C. Nonsmooth variational inequalities on Hadamard manifolds. Appl Anal. 2020;99:340–358.
  • Ansari QH, Babu F. Existence and boundedness of solutions to inclusion problems for maximal monotone vector fields in Hadamard manifolds. Optim Lett. 2020;14:711–727.
  • Ansari QH, Babu F, Li XB. Variational inclusion problems in Hadamard manifolds. J Nonlinear Convex Anal. 2018;19:219–237.
  • Tung LT, Tam DH. Homeomorphic optimality conditions and duality for semi-infinite programming on smooth manifolds. J Nonlinear Funct Anal. 2021;2021:1–18. Article ID 18.
  • Al-Homidan S, Ansari QH, Babu F. Halpern and Mann type algorithms for fixed points and inclusion problems on Hadamard manifolds. Numer Funct Anal Opt. 2019;40:621–653.
  • Ansari QH, Babu F, Yao JC. Regularization of proximal point algorithms in Hadamard manifolds. J Fixed Point Theory Appl. 2019;21. 25.
  • Ansari QH, Babu F. Proximal point algorithm for inclusion problems in Hadamard manifolds with applications. Optim Lett. 2021;15:901–921.
  • Ahmadi P, Khatibzadeh H. On the convergence of inexact proximal point algorithm on Hadamard manifolds. Taiwanese J Math. 2014;18:419–433.
  • Alvarez F, Bolte J, Munier J. A unifying local convergence result for Newton's method in Riemannian manifolds. Found Comput Math. 2008;8:197–226.
  • Bento GC, Ferreira OP, Oliveira PR. Proximal point method for a special class of nonconvex functions on Hadamard manifolds. Optimization. 2012;64:289–319.
  • Ferreira OP, Louzeiro MS, Prudente LF. Gradient method for optimization on Riemannian manifolds with lower bounded curvature. Siam J Optim. 2019;29:2517–2541.
  • Iusem AN, Mohebbi V. An extragradient method for vector equilibrium problems on Hadamard manifolds. J Nonlinear Var Anal. 2021;5:459–476.
  • Sahu DR, Babu F, Sharma S. The S-iterative techniques on Hadamard manifolds and applications. J Appl Numer Optim. 2020;2:353–371.
  • Tang GJ, Huang NJ. An inexact proximal point algorithm for maximal monotone vector fields on Hadamard manifolds. Oper Res Lett. 2013;41:586–591.
  • Wang J, Li C, Lopez G, et al. Convergence analysis of inexact proximal point algorithms on Hadamard manifolds. J Global Optim. 2015;61:553–573.
  • Wang J, Li C, Lopez G, et al. Proximal point algorithms on Hadamard manifolds: linear convergence and finite termination. SIAM J Optim. 2016;26:2696–2729.
  • Li C, Mordukhovich BS, Wang JH, et al. Weak sharp minima on Riemannian manifolds. SIAM J Optim. 2011;21:1523–1560.
  • Li XB, Huang NJ. Generalized weak sharp minima in cone-constrained convex optimization on Hadamard manifolds. Optimization. 2015;64:1521–1535.
  • Bento GC, Cruz Neto JX. Finite termination of the proximal point method for convex functions on Hadamard manifolds. Optimization. 2014;63:1281–1288.
  • Hartman P, Stampacchia G. On some nonlinear elliptic differential functional equations. Acta Math. 1966;115:153–188.
  • Facchinei F, Pang JS. Finite-dimensional variational inequalities and complementarity problems. New York (NY): Springer; 2003.
  • Kinderlehrer D, Stampacchia G. An introduction to variational inequalities and their applications. New York (NY): Academic Press; 1980.
  • Konnov IV. Equilibrium models and variational inequalities. Amsterdam: Elsevier; 2007.
  • Al-Homidan S, Ansari QH, Nguyen LV. Finite convergence analysis and weak sharp solutions for variational inequalities. Opt Lett. 2017;11:1647–1662.
  • Allevi E, Gnudi A, Konnov IV. Generalized vector variational inequalities over countable product of sets. J Glob Optim. 2004;30:155–167.
  • Ceng LC, Petrusel A, Qin X, Yao JC. A modified inertial subgradient extragradient method for solving pseudomonotone variational inequalities and common fixed point problems. Fixed Point Theory. 2020;21:93–108.
  • Ceng LC, Petrusel A, Yao JC, Yao Y. Hybrid viscosity extragradient method for systems of variational inequalities, fixed points of nonexpansive mappings, zero points of accretive operators in Banach spaces. Fixed Point Theory. 2018;19:487–501.
  • Ceng LC, Petrusel A, Qin X, et al. Two inertial subgradient extragradient algorithms for variational inequalities with fixed-point constraints. Optimization. 2021;70:1337–1358.
  • Ceng LC, Shang M. Composite extragradient implicit rule for solving a hierarch variational inequality with constraints of variational inclusion and fixed point problems. J Inequal Appl. 2020;33(2020). https://doi.org/10.1186/s13660-020-2306-1.
  • Ceng LC, Shang M. Hybrid inertial subgradient extragradient methods for variational inequalities and fixed point problems involving asymptotically nonexpansive mappings. Optimization. 2021;70:715–740.
  • Crouzeix JP. Pseudomonotone variational inequality problems: existence of solutions. Math Program. 1997;78:305–314.
  • El Farouq N. Pseudomonotone variational inequalities: convergence of proximal methods. J Optim Theory Appl. 2011;109:311–326.
  • Khanh PD, Vuong PT. Modified projection method for strongly pseudomonotone variational inequalities. J Global Optim. 2014;58:341–350.
  • Khanh PD, Toan HP. An alternative proof for the solution existence of finite-dimensional variational inequalities. Linear Nonlinear Anal. 2019;5:299–304.
  • Kien BT, Yao JC, Yen ND. On the solution existence of pseudomonotone variational inequalities. J Glob Optim. 2008;41:135–145.
  • Kien BT, Lee GM. An existence theorem for generalized variational inequalities with discontinuous and pseudomonotone operators. Nonlinear Anal. 2011;74:1495–1500.
  • Kim DS, Vuong PT, Khanh PD. Qualitative properties of strongly pseudomonotone variational inequalities. Optim Lett. 2016;10:1669–1679.
  • Verma RU. Variational inequalities involving strongly pseudomonotone hemicontinuous mappings in nonreflexive Banach spaces. Appl Math Lett. 1998;11:41–43.
  • Németh SZ. Variational inequalities on Hadamard manifolds. Nonlinear Anal. 2003;52:1491–1498.
  • Li SL, Li C, Liou Y, et al. Variational inequalities on Riemannian manifolds. Nonlinear Anal. 2009;71:5695–5706.
  • Li C, Yao JC. Variational inequalities for set-valued vector fields on Riemannian manifolds: convexity of the solution set and the proximal point algorithm. SIAM J Control Optim. 2012;50:2486–2514.
  • Chen J, Liu S, Chang X. Tseng's extragradient methods for variational inequality on Hadamard manifolds. Appl Anal. 2019. https://doi.org/10.1080/00036811.2019.1695783.
  • Fan J, Qin X, Tan B. Tseng's extragradient algorithm for pseudomonotone variational inequalities on Hadamard manifolds. Appl Anal. 2020. https://doi.org/10.1080/00036811.2020.1807012.
  • Tang GJ, Huang NJ. Korpelevich's method for variational inequality problems on Hadamard manifolds. J Glob Optim. 2012;54:493–509.
  • Tang GJ, Zhou LW, Huang NJ. The proximal point algorithm for pseudomonotone variational inequalities on Hadamard manifolds. Optim Lett. 2013;7:779–790.
  • Tang GJ, Wang X, Liu HW. A projection-type method for variational inequalities on Hadamard manifolds and verification of solution existence. Optimization. 2015;64:1081–1096.
  • Nguyen LV. Weak sharpness and finite termination for variational inequalities on Hadamard manifolds. Optimization. 2020. https://doi.org/10.1080/02331934.2020.1731807.
  • Bot RI, Csetnek ER, Vuong PT. The forward-backward-forward method from continuous and discrete perspective for pseudo-monotone variational inequalities in Hilbert spaces. Eur J Oper Res. 2020;287:49–60.
  • Fan J, Liu L, Qin X. A subgradient extragradient algorithm with inertial effects for solving strongly pseudomonotone variational inequalities. Optimization. 2020;69:2199–2215.
  • Kha PT, Khanh PD. Variational inequalities governed by strongly pseudomonotone operators. Optimization. 2021. https://doi.org/10.1080/02331934.2020.1847107.
  • do Carmo MP. Riemannian geometry. Boston (MA): Birkhauser; 1992.
  • Sakai T. Riemannian geometry. Providence: American Mathematical Society; 1996. (Translations of Mathematical Monographs).
  • Udriste C. Convex functions and optimization methods on Riemannian manifolds. Dordrecht/Boston/London: Kluwer Academic Publishers; 1994.
  • Walter R. On the metric projections onto convex sets in Riemannian spaces. Arch Math. 1974;XXV:91–98.
  • Moudafi A. On finite and strong convergence of a proximal method for equilibrium problems. Numer Funct Anal Optim. 2007;28:1347–1354.
  • Nguyen LV, Ansari QH, Qin X. Linear conditioning, weak sharpness and finite convergence for equilibrium problems. J Global Optim. 2020;77:405–424.

Reprints and Corporate Permissions

Please note: Selecting permissions does not provide access to the full text of the article, please see our help page How do I view content?

To request a reprint or corporate permissions for this article, please click on the relevant link below:

Order Reprints Request Corporate Permissions

Academic Permissions

Please note: Selecting permissions does not provide access to the full text of the article, please see our help page How do I view content?

Obtain permissions instantly via Rightslink by clicking on the button below:

Request Academic Permissions

If you are unable to obtain permissions via Rightslink, please complete and submit this Permissions form. For more information, please visit our Permissions help page.

Related research

People also read lists articles that other readers of this article have read.

Recommended articles lists articles that we recommend and is powered by our AI driven recommendation engine.

Cited by lists all citing articles based on Crossref citations.
Articles with the Crossref icon will open in a new tab.