设为首页
收藏本站
网站地图
|
English
|
公务邮箱
About the library
Background
History
Leadership
Organization
Readers' Guide
Opening Hours
Collections
Help Via Email
Publications
Electronic Information Resources
常用资源
电子图书
期刊论文
学位会议
外文资源
特色专题
内部出版物
CNKI学位论文(22)
知网期刊论文(32)
在“
SpringerLink电子期刊
”中,
命中:
35
条,耗时:小于0.01 秒
在所有数据库中总计命中:
54
条
1.
Fixed point theorems for the sum of (
ws
)-compact and asymptotically
\({\Phi}\)
-nonexpansive mappings
作者:
Afif Ben Amar
;
Donal O’Regan
;
Amel Touati
关键词:
(ws)
;
compact
;
asymptotically \({\Phi}\)
;
nonexpansive
;
weakly compact
;
measure of weak noncompactness
;
demiclosed
;
fixed point theorems
刊名:Journal of Fixed Point Theory and Applications
出版年:2016
2.
On an Iterative Process for Generalized Nonexpansive Multi-valued Mappings in Banach Spaces
作者:
Anupam Sharma
;
Mohammad Imdad
关键词:
Common fixed point
;
Generalized nonexpansive map
;
Weak and strong convergence
;
Demiclosed
ness principle
刊名:Vietnam Journal of Mathematics
出版年:2016
3.
Convergence Theorems for a Hybrid Pair of Generalized Nonexpansive Mappings in Banach Spaces
作者:
Izhar Uddin
;
M. Imdad
;
Javid Ali
关键词:
Common fixed point
;
Generalized nonexpansive mapping
;
Demiclosed
ness
;
Convergence theorems
;
54H25
;
47H10
;
54E50
刊名:Bulletin of the Malaysian Mathematical Sciences Society
出版年:2015
4.
Demiclosed
principle and convergence theorems for asymptotically strictly pseudononspreading mappings and mixed equilibrium problems
作者:
Zhaoli Ma (1)
Lin Wang (2)
1. School of Information Engineering
;
The College of Arts and Sciences Yunnan Normal
;
Long quan Road
;
Kunming
;
650222
;
China
2. College of Statistics and Mathematics
;
Yunnan University of Finance and Economics
;
Long quan Road
;
Kunming
;
650221
;
China
关键词:k ;
asymptotically strictly pseudononspreading mapping
;
mixed equilibrium problem
;
weak and strong convergence
;
demiclosed
principle
刊名:Fixed Point Theory and Applications
出版年:2014
5.
Demiclosed
principle and convergence theorems for total asymptotically nonexpansive nonself mappings in hyperbolic spaces
作者:
Li-Li Wan
关键词:
total asymptotically nonexpansive nonself mappings
;
hyperbolic space
;
△-convergence
刊名:Fixed Point Theory and Applications
出版年:2015
6.
A viscosity approximation method for weakly relatively nonexpansive mappings by the sunny nonexpansive retractions in Banach spaces
作者:
Chin-Tzong Pang
;
Eskandar Naraghirad…
关键词:
47H10
;
37C25
;
viscosity approximation method
;
fixed point
;
weak relatively nonexpansive mapping
;
strong convergence
刊名:Journal of Inequalities and Applications
出版年:2015
7.
On total asymptotically nonexpansive mappings in spaces
作者:
Bancha Panyanak
关键词:
fixed point
;
total asymptotically nonexpansive mapping
;
demiclosed
principle
;
Δ
;
convergence
;
space
刊名:Journal of Inequalities and Applications
出版年:2014
8.
On the existence of ?-fixed points
作者:
Tiziana Cardinali (1)
关键词:
47H10
;
47H04
;
Partially closed
;
β
w ;
partially closed
;
Weakly
demiclosed
;
?
;
fixed point
;
Fixed point
;
?
;
Nash equilibrium
刊名:Central European Journal of Mathematics
出版年:2014
9.
Strong convergence theorems for Bregman W-mappings with applications to convex feasibility problems in Banach spaces
作者:
Eskandar Naraghirad
;
Sara Timnak
关键词:
Bregman function
;
uniformly convex function
;
Bregman W
;
mapping generated by \(S_{n}
;
S_{n
;
1}
;
\ldots
;
S_{1}\)
;
and \(\beta _{n
;
n}
;
\beta_{n
;
n
;
1}
;
\ldots
;
\beta_{n
;
1}\)
;
uniformly smooth function
;
fixed point
;
strong convergence
刊名:Fixed Point Theory and Applications
出版年:2015
10.
A new technique for convergence theorem of fixed point problem of quasi-nonexpansive mapping
作者:
Kanyarat Cheawchan
;
Suthep Suantai…
关键词:
quasi
;
nonexpansive mapping
;
equilibrium problem
;
variational inequality problem
;
fixed point problem
刊名:Fixed Point Theory and Applications
出版年:2015
1
2
3
4
按检索点细分(35)
题名(5)
关键词(22)
文摘(26)
按出版年细分(35)
2016年(2)
2015年(6)
2014年(6)
2013年(5)
2012年(5)
2011年(7)
2010年(2)
2005年(2)
NGLC 2004-2010.National Geological Library of China All Rights Reserved.
Add:29 Xueyuan Rd,Haidian District,Beijing,PRC. Mail Add: 8324 mailbox 100083
For exchange or info please contact us via
email
.