1) Lipschitz strictly pseudocontractive mapping
Lipschitz严格伪压缩映象
1.
Let K be a closed convex subset of an arbitrary real Banach space X,and T ∶K→K be a Lipschitz strictly pseudocontractive mapping such that Tx=x for some x∈X.
设K是任意实Banach空间X中的闭凸子集,T∶K→K是Lipschitz严格伪压缩映象,在没有假设∑n=0∞αnβn<∞之下,本文证明了由xn+1=(1-αn)xn+αnTyn+un与yn=(1-βn)xn+βnTxn+vn,n∈N,生成的带误差的Ishikawa迭代序列强收敛到T的唯一不动点,并给出了更为一般的收敛率估计:若un=vn=0,n∈N,则有‖xn+1-x*‖≤(1-γn)‖xn-x*‖≤…≤∏j=0n(1-γj)‖x0-x*‖,其中{γn}是(0,1)中的序列,满足γn≥1/(1+k)min(ε,η-ε)αn。
2) strictly pseudocontractive map
严格伪压缩映象
1.
A note on iterative approximation of fixed points of strictly pseudocontractive mapping;
关于严格伪压缩映象不动点迭代逼近的一点注记
2.
The strong convergence of a modified Mann iteration for strictly pseudocontractive maps;
关于一种严格伪压缩映象Mann迭代序列的强收敛性
3) strictly pseudocontractive mapping
严格伪压缩映象
1.
It proves in a Banach space that Ishikawa iterative sequence strongly converges at the fixed point of strictly pseudocontractive mappings on arbitrary closed, convex sets.
在Banach空间中证明了Ishikawa迭代序列强收敛到任意闭凸集上严格伪压缩映象的不动点,并得到更为精确的收敛速率估计。
2.
Let T: KK be a Lipschitz strictly pseudocontractive mapping.
设E是实Banach空间,K是E的非空闭子集,T:KK是Lipschitz严格伪压缩映象。
4) Lipschizian strongly pseudocontractive mapping
Lipschitz强伪压缩映象
1.
Let X be a closed subspace of a real Banach space E , and T:X→X be a Lipschizian strongly pseudocontractive mapping with fixed point x~* .
设X是实Banach空间E的闭子空间,T:X→X是Lipschitz强伪压缩映象,x*为T的不动点。
5) local strict pseuco-contraction mapping
局部严格伪压缩映象
6) k-strictly asymptotically pseudocontractive mapping
k-严格渐近伪压缩映象
补充资料:[3-(aminosulfonyl)-4-chloro-N-(2.3-dihydro-2-methyl-1H-indol-1-yl)benzamide]
分子式:C16H16ClN3O3S
分子量:365.5
CAS号:26807-65-8
性质:暂无
制备方法:暂无
用途:用于轻、中度原发性高血压。
分子量:365.5
CAS号:26807-65-8
性质:暂无
制备方法:暂无
用途:用于轻、中度原发性高血压。
说明:补充资料仅用于学习参考,请勿用于其它任何用途。
参考词条