| 1. | Iterative approximation of solutions for a class of nonlinear operator equations
正定算子方程的逼近解 |
| 2. | Fixed point theorems of nonlinear operators with counter upper - down solution condition
反向上下解条件下的非线性算子的不动点定理 |
| 3. | Iterative solution of a kind of nonlinear operator equations in banach space
解算子与右端数据均有扰动的半正定算子方程的动态系统方法 |
| 4. | Iterative solution of some classes of nonlinear operators equations in banach space and its applications
空间中几类非线性算子方程的迭代解法及其应用 |
| 5. | Convergence rates of regularized solutions of nonlinear operator equation of the first kind involving monotone operators
非线性第一类单调算子方程正则解的收敛率讨论 |
| 6. | The algorithm problem of solving nonlinear operator equation f ( x ) = 0 in banach space has been studieded by many numerical scientists
求解banach空间中非线性方程f ( x ) = 0算法问题,一直是数值工作者所研究的问题。 |
| 7. | The purpose of this paper is to discuss two classes of nonlinear equations , one of which is nonlinear operator equations with concavity or convexity and the other is nonlinear integro - differential equations in banach space
在本文中,我们主要讨论了banach空间中两类非线性方程,其一为具有凹凸性的非线性算子方程,其二为非线性积分-微分方程 |
| 8. | In this article , we mainly dicuss special nonlinear operator ' s and set - valued mapping ' s ishikawa and mann iteration in any banach space . as whole , we mainly touch on some aspects as follow : - strongly pseudocontractire operator ' s ishikawa and mann iteration in a cone
本文主要是在任意的banach空间中讨论特定类型的非线性算子与集值映射的ishikawa与mann迭代,归纳起来,主要有下面几个方面:锥上-强伪压缩算子的ishikawa与mann迭代 |
| 9. | Professor guo dajun has summarized in his work [ 7 ] . such several important tasks and theirs application of nonlinear functional analysis as typical nonlinear operators , hammerstein integral operations , ordinarily and partially differential equations . the cone theory , the positive solutions of nonlinear operator equations , the number and the branch of solutions , and so on . reference [ 1 ] includes all levels of results of the domain such as nonlinear functional analysis
郭大钧先生在专著[ 7 ]中对非线性泛函分析的几个重要课题及其应用,诸如典型的非线性算子、 hammerstein积分方程、常、偏微分方程、迁移方程、锥理论及非线性算子方程的正解、非线性算子拓扑度和不动点定理以及固有值、解的个数与分支,都做了系统的概括和总结 |
| 10. | Nonlinear operator theorem is now a focus in nonlinear theorem . the study of the ergodic theory for semitopologocal semigroups of nonlinear operators began in the middle of 1970 ' s . it got great development because it was widely used in many problems , such as the numerical solution of differentiable equation , the existence theory of positive solution , contral theory and optimization
非线性算子理论是非线性理论中的热门话题,它的研究始于上世纪七十年代中期,由于它被广泛的应用于微分方程的数值解、正解的存在性理论、控制论以及最优化等问题中,因而得到了很大的发展。 |
