Generalized Monotone Mappings with an Application to Variational Inclusions

Tirth Ram; Mohd Iqbal

doi:10.26713/cma.v13i2.1723

Authors

Tirth Ram Department of Mathematics, University of Jammu, Jammu, India https://orcid.org/0000-0002-6447-6767
Mohd Iqbal Department of Mathematics, University of Jammu, Jammu, India https://orcid.org/0000-0002-3269-9333

DOI:

https://doi.org/10.26713/cma.v13i2.1723

Keywords:

Monotone mapping, Variational inclusions, Iterative algorithm, Resolvent operator, Semi-inner product space

Abstract

In this paper, we study a generalized monotone mapping, which is the sum of cocoercive and monotone mapping. The resolvent operator associated with generalized monotone mapping is defined, and some of its properties are discussed. We employ the equivalent formulation of generalized set-valued variational inclusion problems and resolvent equations to show the existence of a solution. In addition, we create an iterative algorithm for the convergence of resolvent equations and solving generalized set-valued variational inclusion problem. An example has also been provided to support the main result.

Downloads

Download data is not yet available.

References

R. Ahmad, M. Dilshad, M.M. Wong and J.C. Yao, H(·,·)-cocoercive operator and an application for solving generalized variational inclusions, Abstract and Applied Analysis 2011 (2011) Article ID 261534, DOI: 10.1155/2011/261534.

R. Ahmad, A.H. Siddiqi and M. Dilshad, Application of H(·,·)-cocoercive operators for solving a set-valued variational inclusion problem via a resolvent equation problem, Indian Journal of Industrial and Applied Mathematics 4(2) (2013), 160 – 169, DOI: 10.5958/j.1945-919X.4.2.018.

R. Ahmad, A.H. Siddiqi and Z. Khan, Proximal point algorithm for generalized multi-valued nonlinear quasi-variational-like inclusions in Banach spaces, Applied Mathematics and Computation 163(1) (2005), 295 – 308, DOI: 10.1016/j.amc.2004.02.021.

J.P. Aubin and A. Cellina, Differential Inclusions, Springer-Verlag, Berlin (1984).

M.I. Bhat and B. Zahoor, Existence of solution and iterative approximation of a system of generalized variational-like inclusion problems in semi-inner product spaces, Filomat 31(19) (2017), 6051 – 6070, DOI: 10.2298/FIL1719051B.

S.S. Chang, J.K. Kim and K.H. Kim, On the existence and iterative approximation problems of solutions for set-valued variational inclusions in Banach spaces, Journal of Mathematical Analysis and Applications 268(1) (2002), 89 – 108, DOI: 10.1006/jmaa.2001.7800.

J.R. Giles, Classes of semi-inner product spaces Transactions of the American Mathematical Society 129 (1967), 436 – 446, DOI: 10.2307/1994599.

S. Gupta and M. Singh, Variational-like inclusion involving infinite family of set-valued mappings governed by resolvent equations, Journal of Mathematical and Computational Science 11(1) (2021), 874 – 892, DOI: 10.28919/jmcs/5177.

S. Gupta and M. Singh, Generalized monotone mapping and resolvent equation technique with an application, Journal of Mathematical and Computational Science 11(2) (2021), 1767–1783, DOI: 10.28919/jmcs/5343.

N.J. Huang, M.R. Bai, Y.J. Cho and S.M. Kang, Generalized nonlinear mixed quasi-variational inequalities, Computers & Mathematics with Applications 40(2-3) (2000), 205 – 215, DOI: 10.1016/S0898-1221(00)00154-1.

S. Husain, S. Gupta and V.N. Mishra, Generalized H(·,·,·)-η-cocoercive operators and generalized set-valued variational-like inclusions, Journal of Mathematics 2013 (2013), Article ID 738491, DOI: 10.1155/2013/738491.

D.O. Koehler, A note on some operator theory in certain semi-inner-product space, Proceedings of the American Mathematical Society 30 (1971), 363 – 366, DOI: 10.1090/S0002-9939-1971-0281024-6.

G. Lumer, Semi-inner product spaces, Transactions of the American Mathematical Society 100 (1961), 29 – 43, DOI: 10.2307/1993352.

X.P. Luo and N.J. Huang, (H,φ)-η-monotone operators in Banach spaces with an application to variational inclusions, Applied Mathematics and Computation 216 (2010), 1131 – 1139, DOI: 10.1016/j.amc.2010.02.005.

P. Marcotte and J.H. Wu, On the convergence of projection methods: Application to the decomposition of affine variational inequalities, Journal of Optimization Theory and Applications 85 (1995), 347 – 362, DOI: 10.1007/BF02192231.

T. Ram, Parametric generalized nonlinear quasi-variational inclusion problems, International Journal of Mathematical Archive 3 (3) (2012), 1273 – 1282, http://www.ijma.info/index.php/ijma/article/view/1119/634.

T. Ram and M. Iqbal, H(·,·,·,·)-ϕ-η-cocoercive operator with an application to variational inclusions, International Journal of Nonlinear Analysis and Applications 13(1) (2022), 1311 – 1327, DOI: 10.22075/IJNAA.2021.23245.2506.

N.K. Sahu, R.N. Mohapatra, C. Nahak and S. Nanda, Approximation solvability of a class of A-monotone implicit variational inclusion problems in semi-inner product spaces, Applied Mathematics and Computation 236 (2014), 109 – 117, DOI: 10.1016/j.amc.2014.02.095.

P. Tseng, Further applications of a splitting algorithm to decomposition in variational inequalities and convex programming, Mathematical Programming 48(1) (1990), 249 – 263, DOI: 10.1007/BF01582258.

H.K. Xu, Inequalities in Banach spaces with applications, Nonlinear Analysis 16(12) (1991), 1127–1138, DOI: 10.1016/0362-546X(91)90200-K.

D.L. Zhu and P. Marcotte, Co-coercivity and its role in the convergence of iterative schemes for solving variational inequalities, SIAM Journal on Optimization 6(3) (1996), 714 – 726, DOI: 10.1137/S1052623494250415.

Y.Z. Zou and N.J. Huang, H(·,.)-accretive operator with an application for solving variational inclusions in Banach spaces, Applied Mathematics and Computation 204(2) (2008), 809 – 816, DOI: 10.1016/j.amc.2008.07.024.

Generalized Monotone Mappings with an Application to Variational Inclusions

Authors

DOI:

Keywords:

Abstract

Downloads

References

Downloads

Published

How to Cite

Issue

Section

License

Make a Submission

Indexed in