In this paper, to find the fixed points of the nonexpansive nonself-mappings, we introduced two new viscosity approximation methods, and then we prove the iterative sequences defined by above viscosity approximation m...In this paper, to find the fixed points of the nonexpansive nonself-mappings, we introduced two new viscosity approximation methods, and then we prove the iterative sequences defined by above viscosity approximation methods which converge strongly to the fixed points of nonexpansive nonself-mappings. The results presented in this paper extend and improve the results of Song-Chen [1] and Song-Li [2].展开更多
Let E be a real uniformly convex and smooth Banach space, and K be a nonempty closed convex subset of E with P as a sunny nonexpansive retraction. Let T1, T2 : K → E be two weakly inward nonself asymptotically nonex...Let E be a real uniformly convex and smooth Banach space, and K be a nonempty closed convex subset of E with P as a sunny nonexpansive retraction. Let T1, T2 : K → E be two weakly inward nonself asymptotically nonexpansive mappings with respect to P with a sequence {kn^(i)} [1, ∞) (i = 1, 2), and F := F(T1)∩ F(T2) ≠ 0. An iterative sequence for approximation common fixed points of the two nonself asymptotically nonexpansive mappings is discussed. If E has also a Frechet differentiable norm or its dual E^* has Kadec-Klee property, then weak convergence theorems are obtained.展开更多
最近,文献(Fixed Point Theory and Applications,2013,122(1):1687-1812.)在CAT(0)空间中研究了一迭代方案的△-收敛性.受他们的启发,在双曲空间的框架下,介绍了一种新的迭代方案,并在一定条件下,证明了△-收敛定理,结果改进和推广了...最近,文献(Fixed Point Theory and Applications,2013,122(1):1687-1812.)在CAT(0)空间中研究了一迭代方案的△-收敛性.受他们的启发,在双曲空间的框架下,介绍了一种新的迭代方案,并在一定条件下,证明了△-收敛定理,结果改进和推广了近期一些文献的相应结果.展开更多
在实Banach空间中,研究迭代序列x(n+1)=P[(1-αn)xn+αn(1/(n+1))∑ from j=1 to n+1 T(PT)^(j-1)yn],yn=P[(1-βn)xn+βn(1/(n+1))∑ from j=1 to n+1 T(PT)^(j-1)xn]在对参数适当限制条件下逼近一致L-Lipschitzian非自映象的不动点问题.
文摘In this paper, to find the fixed points of the nonexpansive nonself-mappings, we introduced two new viscosity approximation methods, and then we prove the iterative sequences defined by above viscosity approximation methods which converge strongly to the fixed points of nonexpansive nonself-mappings. The results presented in this paper extend and improve the results of Song-Chen [1] and Song-Li [2].
文摘Let E be a real uniformly convex and smooth Banach space, and K be a nonempty closed convex subset of E with P as a sunny nonexpansive retraction. Let T1, T2 : K → E be two weakly inward nonself asymptotically nonexpansive mappings with respect to P with a sequence {kn^(i)} [1, ∞) (i = 1, 2), and F := F(T1)∩ F(T2) ≠ 0. An iterative sequence for approximation common fixed points of the two nonself asymptotically nonexpansive mappings is discussed. If E has also a Frechet differentiable norm or its dual E^* has Kadec-Klee property, then weak convergence theorems are obtained.
文摘最近,文献(Fixed Point Theory and Applications,2013,122(1):1687-1812.)在CAT(0)空间中研究了一迭代方案的△-收敛性.受他们的启发,在双曲空间的框架下,介绍了一种新的迭代方案,并在一定条件下,证明了△-收敛定理,结果改进和推广了近期一些文献的相应结果.
文摘在实Banach空间中,研究迭代序列x(n+1)=P[(1-αn)xn+αn(1/(n+1))∑ from j=1 to n+1 T(PT)^(j-1)yn],yn=P[(1-βn)xn+βn(1/(n+1))∑ from j=1 to n+1 T(PT)^(j-1)xn]在对参数适当限制条件下逼近一致L-Lipschitzian非自映象的不动点问题.