数学物理学报(英文版) ›› 2018, Vol. 38 ›› Issue (2): 610-626.doi: 10.1016/S0252-9602(18)30769-0

• 论文 • 上一篇    下一篇

CONVERGENCE OF HYBRID VISCOSITY AND STEEPEST-DESCENT METHODS FOR PSEUDOCONTRACTIVE MAPPINGS AND NONLINEAR HAMMERSTEIN EQUATIONS

Yekini SHEHU1, Olaniyi. S. IYIOLA2   

  1. 1. Department of Mathematics, University of Nigeria, Nsukka, Nigeria;
    2. Department of Mathematics, Minnesota State University, Moorhead, Minnesota, USA
  • 收稿日期:2016-10-24 出版日期:2018-04-25 发布日期:2018-04-25
  • 作者简介:Yekini SHEHU,E-mail:yekini.shehu@unn.edu.ng;Olaniyi. S. IYIOLA,E-mail:olaniyi.iyiola@mnstate.edu

CONVERGENCE OF HYBRID VISCOSITY AND STEEPEST-DESCENT METHODS FOR PSEUDOCONTRACTIVE MAPPINGS AND NONLINEAR HAMMERSTEIN EQUATIONS

Yekini SHEHU1, Olaniyi. S. IYIOLA2   

  1. 1. Department of Mathematics, University of Nigeria, Nsukka, Nigeria;
    2. Department of Mathematics, Minnesota State University, Moorhead, Minnesota, USA
  • Received:2016-10-24 Online:2018-04-25 Published:2018-04-25

摘要:

In this article, we first introduce an iterative method based on the hybrid viscosity approximation method and the hybrid steepest-descent method for finding a fixed point of a Lipschitz pseudocontractive mapping (assuming existence) and prove that our proposed scheme has strong convergence under some mild conditions imposed on algorithm parameters in real Hilbert spaces. Next, we introduce a new iterative method for a solution of a nonlinear integral equation of Hammerstein type and obtain strong convergence in real Hilbert spaces. Our results presented in this article generalize and extend the corresponding results on Lipschitz pseudocontractive mapping and nonlinear integral equation of Hammerstein type reported by some authors recently. We compare our iterative scheme numerically with other iterative scheme for solving non-linear integral equation of Hammerstein type to verify the efficiency and implementation of our new method.

关键词: Lipschitz pseudocontractive mapping, monotone operators, equations of Hammerstein type, strong convergence, Hilbert spaces

Abstract:

In this article, we first introduce an iterative method based on the hybrid viscosity approximation method and the hybrid steepest-descent method for finding a fixed point of a Lipschitz pseudocontractive mapping (assuming existence) and prove that our proposed scheme has strong convergence under some mild conditions imposed on algorithm parameters in real Hilbert spaces. Next, we introduce a new iterative method for a solution of a nonlinear integral equation of Hammerstein type and obtain strong convergence in real Hilbert spaces. Our results presented in this article generalize and extend the corresponding results on Lipschitz pseudocontractive mapping and nonlinear integral equation of Hammerstein type reported by some authors recently. We compare our iterative scheme numerically with other iterative scheme for solving non-linear integral equation of Hammerstein type to verify the efficiency and implementation of our new method.

Key words: Lipschitz pseudocontractive mapping, monotone operators, equations of Hammerstein type, strong convergence, Hilbert spaces