• Communications of the Korean Mathematical Society
• /
• v.39 no.2
• /
• pp.421-436
• /
• 2024

In this article, we propose a shrinking projection algorithm for solving a finite family of generalized equilibrium problem which is also a fixed point of a nonexpansive mapping in the setting of Hadamard manifolds. Under some mild conditions, we prove that the sequence generated by the proposed algorithm converges to a common solution of a finite family of generalized equilibrium problem and fixed point problem of a nonexpansive mapping. Lastly, we present some numerical examples to illustrate the performance of our iterative method. Our results extends and improve many related results on generalized equilibrium problem from linear spaces to Hadamard manifolds. The result discuss in this article extends and complements many related results in the literature.

• Nonlinear Functional Analysis and Applications
• /
• v.28 no.2
• /
• pp.497-520
• /
• 2023

Numerous problems in science and engineering defined by nonlinear functional equations can be solved by reducing them to an equivalent fixed point problem. Fixed point theory provides essential tools for solving problems arising in various branches of mathematical analysis, such as split feasibility problems, variational inequality problems, nonlinear optimization problems, equilibrium problems, complementarity problems, selection and matching problems, and problems of proving the existence of solution of integral and differential equations.The theory of fixed is known to find its applications in many fields of science and technology. For instance, the whole world has been profoundly impacted by the novel Coronavirus since 2019 and it is imperative to depict the spread of the coronavirus. Panda et al. [24] applied fractional derivatives to improve the 2019-nCoV/SARS-CoV-2 models, and by means of fixed point theory, existence and uniqueness of solutions of the models were proved. For more information on applications of fixed point theory to real life problems, authors should (see [6, 13, 24] and the references contained in).

• Journal of applied mathematics & informatics
• /
• v.29 no.1_2
• /
• pp.227-245
• /
• 2011

In this paper, we introduce a new iterative method for finding a common element of the set of solutions for mixed equilibrium problem, the set of solutions of the variational inequality for a ${\beta}$inverse-strongly monotone mapping and the set of fixed points of a family of finitely nonexpansive mappings in a real Hilbert space by using the viscosity and Ces$\`{a}$ro mean approximation method. We prove that the sequence converges strongly to a common element of the above three sets under some mind conditions. Our results improve and extend the corresponding results of Kumam and Katchang [A viscosity of extragradient approximation method for finding equilibrium problems, variational inequalities and fixed point problems for nonexpansive mapping, Nonlinear Analysis: Hybrid Systems, 3(2009), 475-86], Peng and Yao [Strong convergence theorems of iterative scheme based on the extragradient method for mixed equilibrium problems and fixed point problems, Mathematical and Computer Modelling, 49(2009), 1816-828], Shimizu and Takahashi [Strong convergence to common fixed points of families of nonexpansive mappings, Journal of Mathematical Analysis and Applications, 211(1) (1997), 71-83] and some authors.

• Journal of the Korean Mathematical Society
• /
• v.32 no.3
• /
• pp.493-507
• /
• 1995

The Hartman-Stampacchia variational inequality was first suggested and studied by Hartman and Stampacchia [8] in finite dimensional spaces during the time establishing the base of variational inequality theory in 1960s [4]. Then it was generalized by Lions et al. [6], [9], [10], Browder [3] and others to the case of infinite dimensional inequality [3], [9], [10], and the results concerning this variational inequality have been applied to many important problems, i.e., mechanics, control theory, game theory, differential equations, optimizations, mathematical economics [1], [2], [6], [9], [10]. Recently, the Browder-Hartman-Stampaccnia variational inequality was extended to the case of set-valued monotone mappings in reflexive Banach sapces by Shih-Tan [11] and Chang [5], and under different conditions, they proved some existence theorems of solutions of this variational inequality.

• The Pure and Applied Mathematics
• /
• v.14 no.1 s.35
• /
• pp.37-48
• /
• 2007

In this paper, we introduce and study a class of generalized multivalued quasivariational inclusions for fuzzy mappings, and establish its equivalence with a class of fuzzy fixed-point problems by using the resolvent operator technique. We suggest a new iterative algorithm for the generalized multivalued quasivariational inclusions. Further, we establish a few existence results of solutions for the generalized multivalued quasivariational inclusions involving $F_r$-relaxed Lipschitz and $F_r$-strongly monotone mappings, and discuss the convergence criteria for the algorithm.

• Nonlinear Functional Analysis and Applications
• /
• v.27 no.1
• /
• pp.203-221
• /
• 2022

In this paper, we introduce new hybrid inertial contraction projection algorithms for solving variational inequality problems over the intersection of the fixed point sets of demicontractive mappings in a real Hilbert space. The proposed algorithms are based on the hybrid steepest-descent method for variational inequality problems and the inertial techniques for finding fixed points of nonexpansive mappings. Strong convergence of the iterative algorithms is proved. Several fundamental experiments are provided to illustrate computational efficiency of the given algorithm and comparison with other known algorithms

• Proceedings of the Korea Water Resources Association Conference
• /
• 2011.05a
• /
• pp.67-67
• /
• 2011

지구 온난화 등에 의한 이상기후 현상으로 인해 야기되는 대규모 호우 등의 기상이변 현상은 댐 및 제방 붕괴와 같은 비상상황을 발생시키고 있고, 실제로 최근 10년간 태풍 등의 기상이변 현상으로 인해 낙동강의 여러 지류하천의 제방이 붕괴되는 피해가 발생했으며, 잇따른 피해들은 이 분야에 대한 종합적인 연구의 필요성을 증대시켰다. 본 연구의 목적은 이상홍수 및 국지성 호우에 의해서 하천 제방의 붕괴로 인한 제내지에서의 비상상황 발생에 대비하기 위해, 제내지에서의 범람홍수 해석결과를 통한 홍수위험지도 제작을 위한 tool로 활용함으로써 피해예상지역 내 주민 등의 신속한 대처를 통해 주민의 생명과 재산을 보호하기 위함에 있다. 이러한 하도 및 제내지에서의 범람홍수 양상을 효율적으로 계산하기 위해 실제 제방붕괴사례를 포함하는 사상에 대해 1차원 하천흐름 해석을 실시하였으며, 이를 통해 산정되는 제방붕괴 유출유량을 통해 제내지에 대한 2차원 범람홍수해석을 실시하였다. 1차원 제방붕괴 해석을 위해 FLDWAV 모형을 적용하였으며, 2차원 범람해석 모형으로 흐름의 전파양상을 정확하게 반영할 수 있는 상류이송기법인 Godunov 기법과 수치적인 계산 이전에 인접자료의 값을 이용하여 자료를 재구성하는 MUSCL(Monotone Upstream-centered Schemes for Conservation Laws) 기법을 사용하여 개발된 고정확도 유한체적모형을 적용하였다. 실제 제방붕괴 사상을 적용하기 위해 남강의 제방붕괴 사례를 고려하였으며, 2003년과 2006년에 각각 발생한 태풍 매미와 에위니아 사상에 대해 1차원 하천흐름해석 및 2차원 홍수범람해석을 실시하였다. 1차원 하천흐름해석에 대해서 하천 내에 위치한 수위표에서 관측된 실측수위를 통해 검증을 실시하였으며, 2차원 범람홍수모형에 의해 산정된 홍수범람범위는 침수흔적도를 통해 검증하였다. 본 연구에서 개발되어 적용된 2차원 범람해석 모형을 국가홍수위험지도 제작에 대해 활용할 수 있다면, 정확도 높은 통합홍수방재시스템 구축에 기여할 수 있을 것으로 기대된다.