摘要
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αn{},βn{}为[0,1]中的两个实数列满足:(ⅰ)αn→0(n→∞);(ⅱ)βn<k(1-k)L(1+L)(n≥0);(ⅲ)∑∞n=0αn=∞·假设un{}∞n=0和vn{}∞n=0为X中两序列满足:‖un‖=o(αn)与vn→0(n→∞)·任取x0∈X,则由(IS)1xn+1=(1-αn)xn+αnSyn+unyn=(1-βn)xn+βnSxn+vn(n≥0){所定义的迭代序列xn{}强收敛于方程Tx=f的唯一解·一个相关结果处理φ_半压缩映象的不动点的迭代逼近·
Let X be a real Banach space with a uniformly convex dual X * . Let T:X→X be a Lipschitzian and strongly accretive mapping with a Lipschitzian constant L≥1 and a strongly accretive constant k∈(0,1) . Let α n,β n be two real sequences in satisfying: (ⅰ) α n→0 as n→∞; (ⅱ) β n<k(1-k)L(1+L), for all n≥0; (ⅲ) ∑∞n=0α n=∞ . Set Sx=f-Tx+x,x∈X . Assume that u n ∞ n=0 and v n ∞ n=0 be two sequences in X satisfying ‖u n‖=o(α n) and v n→0 as n→∞ . For arbitrary x 0∈X, the iteration sequence x n is defined by ( IS) 1x n+1 =(1-α n)x n+α nSy n+u n y n=(1-β n)x n+β nSx n+v n (n≥0) then x n converges strongly to the unique solution of the equation Tx=f . A related result deals with iterative approximation of fixed points of φ_ hemicontractive mappings.
出处
《应用数学和力学》
EI
CSCD
北大核心
1999年第3期269-276,共8页
Applied Mathematics and Mechanics
关键词
巴拿赫空间
强增生算子
迭代解
非线性方程
Ishikawa iteration with errors
strongly accretive mapping
φ _hemicontractive mapping
