增生算子粘性逼近的强收敛定理

假设$E$为实Banach空间, $A$为具有零点的增生算子. 定义序列 $\{x_n\}$如下: $x_{n+1}=\alpha_n f(x_n)+(1-\alpha_n)J_{r_n}x_n$, 这里$\{\alpha_n\}$, $\{r_n\}$ 满足一定条件的序列, 令$J_r=(I+rA)^{-1}$, $r>1$. 假如空间$E$有弱连续对偶映像,或者$E$为一致光滑的,均得到了序列 $\{x_n\}$的强收敛性结果.     

Banach空间中有限个增生算子公共零点的迭代强收敛定理

令E为实自反Banach空间具一致Gteaux可微范数,AiE×E(i=1,2,…,k)为增生算子且满足∩ki=1Ai-1(0)≠φ.令C为E的非空闭凸子集并满足■C∩r>0R(I+rAi),i=1,2,…,k.将引入一种带误差项的迭代算法,并证明迭代序列强收敛于{Ai}ki=1的公共零点.     

Banach空间中增生算子方程的Ishikawa迭代解

在没有∑∞n=0αnβn<∞的更弱条件下,使用与完全不同的方法,证明了Ishikawa迭代序列强收敛Lipschitz连续的增生算子T的方程x+Tx=f的唯一解,并提供了更为全面和一般的收敛率的估计.本文结果是引文[3-4]中相应结果的统一和发展.     

Banach空间中扰动增生算子的迭代程序

给出两类扰动增生算子的迭代程序,并证明它们的收敛性.     

Banach空间中逆强增生算子修正的Halpern迭代序列强收敛性

在一致凸一致光滑的Banach空间中,引进了一个新的修正的Halpern迭代序列,并证明了该迭代序列关于α-逆强增生算子的强收敛性,所得结果把其他一些相关的近代结果从2-一致光滑Banach空间推广到一致光滑Banach空间,并且证明方法也不相同.     

Banach空间中关于增生算子方程的迭代法的强收敛定理

设X是一实Banach空间,且TX→X是Lipschitz连续的增生算子.在没有假设lim αn=1imβn=0之下,本文证明了,Ishikawa迭代序列强收敛到方程x+Tx=f的唯一解,而且还对Ishikawa迭代序列提供了一般的收敛率估计.利用该结果,我们推得,当TX→X是Lipschitz连续的强增生算子时,Ishikawa迭代序列强收敛到方程Tx=f的唯一解.     

Banach空间中关于增生算子方程的迭代法的强收敛定理

设X是一实Banach空间,且T:X→X是Lipschitz连续的增生算子.在没有假设limn→∞αn=lim n→∞βn=0之下,本文证明了,Ishikawa迭代序列强收敛到方程x+Tx=f的唯一解,而且还对Ishikawa迭代序列提供了一般的收敛率估计.利用该结果,我们推得,当T:X→X是Lipschitz连续的强增生算子时, Ishikawa迭代序列强收敛到方程Tx=f的唯一解.     

增生算子迭代法与收缩半群强收敛的充要条件

在一定条件下,证明了增生算子的预解式迭代法强收敛于零点的充要条件,以及非线性收缩半群强收敛于平衡点的充要条件。这些与蒋耀林等人（1994年）所获得的相应弱收敛充要条件相对应。     

Banach空间中增生算子T的方程f=x＋Tx的迭代解

在具有一致凸对偶空间的Banach空间中讨论了关于增生算子T的方程f=x Tx的迭代解,其结果推广和改进了Chidume和Zhu的结果。     

Banach空间中一般的强增生算子方程解的迭代逼近

设1相似文献   

Banach空间中的非线性增生算子随机方程

本文引进（ＪＭ）型算子的概念，并证明非线性增生算子和（ＪＭ）型算子随机方程的解的存在定理。     

Strong Convergence of an Iterative Method with Perturbed Mappings for Nonexpansive and Accretive Operators

A new iterative method for finding a zero of m-accretive operators is proposed. This method, involving a so-called perturbed mapping, provides a way to construct sunny nonexpansive retractions. Several strong convergence theorems for this method are established in a Banach space that is either uniformly smooth or reflexive with a weakly continuous duality map.     

关于Banach空间中增生算子方程的迭代法收敛率估计

本文研究Banach空间中增生算子方程的Ishikawa迭代法收敛率估计。本文所得结果在以下方面改进和推广了刘理蔚的结果（Nonlinear Anal.42(2)(2000),271-276):(1)以假设{αn},{βn}在不同区间上独立取值代替刘的假设limn→∞αn=limn→∞βn＝0；（2）以一般的收敛率估计和几何收敛率估计代替刘的收敛率估计||xm=x^*||=O(1/m）。     

Iterative approximation for a zero of accretive operator and fixed points problems in Banach space

In this paper we introduced an iteration scheme for viscosity approximation for a zero of accretive operator and fixed points problems in a reflexive Banach space with weakly continuous duality mapping. A new iterative sequence is introduced and strong convergence of the algorithm x_n is proved. The results improve and extend the results of Hu and Liu [L. Hu and L. Liu, A new iterative algorithm for common solutions of a finite family of accretive operators, Nonlinear Anal. 70 (2009) 2344-2351] and some others.     

Banach空间中含强增生算子的非线性方程的迭代解

设X为实Banach空间,X*为其一致凸的共轭空间.设T:X→X为Lipschitzian强增生映象,L≥1为其Lipschitzian常数,k∈(0,1)为其强增生常数.设{α_n},{β_n}为[0,1]中的两个实数列满足:(ⅰ)α_n→0(n→∞);(ⅱ)β_n<L(1+L)/k(1-k)(n≥0);(ⅲ).假设为X中两序列满足:=o(β_n)与μ_n→0(n→∞).任取x₀∈X,则由(IS)1x_n+1=(1-α_n)x_n+α_nSy_n+u_ny_n=(1-β_n)x_n+β_nSx_n+μ_n(_n≥0){所定义的迭代序列{x_n强收敛于方程T     

Viscosity Approximation Methods for Multivalued Mappings in Banach Spaces

Let K be a nonempty closed and convex subset of a real reflexive Banach space X that has weakly sequentially continuous duality mapping J. Let T: K → K be a multivalued non-expansive non-self-mapping satisfying the weakly inwardness condition as well as the condition T(y) = {y} for any y ∈ F(T) and such that for a contraction f: K → K and any t ∈ (0, 1), there exists x _t  ∈ K satisfying x _t  ∈ tf(x _t ) + (1 ? t)Tx _t . Then it is proved that {x _t } ? K converges strongly to a fixed point of T, which is also a solution of certain variational inequality. Moreover, the convergence of two explicit methods are also investigated.     

关于Banach空间中增生和伪压缩型映象迭代序列的收敛性问题

得出了Banach空间中增生和伪压缩型映象Ishikawa、Mann和最速下降序列强收敛于其不动点的充分必要条件.所得结果推广、改进和包含了某些最新的结果.     

Fixed Point Theory for 1-Set Weakly Contractive Operators in Banach Spaces

In this work, using an analogue of Sadovskii＇s fixed point result and several important inequalities we investigate and give new existence theorems for the nonlinear operator equation F（x） =μx, （μ≥1） for some weakly sequentially continuous, weakly condensing and weakly 1-set weakly contractive operators with different boundary conditions. Correspondingly, we can obtain some applicable fixed point theorems of Leray-Schauder, Altman and Furi-Pera types in the weak topology setting which generalize and improve the corresponding results of [3,15,16].