×
验证码:
换一张
忘记密码?
记住我
CORC
首页
科研机构
检索
知识图谱
申请加入
托管服务
登录
注册
在结果中检索
科研机构
兰州大学 [6]
兰州理工大学 [3]
西安交通大学 [1]
数学与系统科学研究院 [1]
上海大学 [1]
广东海洋大学 [1]
更多...
内容类型
期刊论文 [12]
会议论文 [1]
发表日期
2016 [2]
2014 [4]
2011 [2]
2010 [1]
2008 [1]
2000 [2]
更多...
学科主题
mathematic... [3]
engineerin... [2]
computer s... [1]
×
知识图谱
CORC
开始提交
已提交作品
待认领作品
已认领作品
未提交全文
收藏管理
QQ客服
官方微博
反馈留言
浏览/检索结果:
共13条,第1-10条
帮助
已选(
0
)
清除
条数/页:
5
10
15
20
25
30
35
40
45
50
55
60
65
70
75
80
85
90
95
100
排序方式:
请选择
作者升序
作者降序
题名升序
题名降序
发表日期升序
发表日期降序
提交时间升序
提交时间降序
A mollification regularization method for identifying the time-dependent heat source problem
期刊论文
Journal of Engineering Mathematics, 2016, 卷号: 100, 期号: 1, 页码: 67-80
作者:
Yang, Fan
;
Fu, Chu-Li
;
Li, Xiao-Xiao
收藏
  |  
浏览/下载:7/0
  |  
提交时间:2017/01/12
A posteriori parameter choice
Error estimate
Identifying time-dependent source
Ill-posedness
Inverse source problem
Mollification methods
Parabolic equation
A mollification regularization method for identifying the time-dependent heat source problem
期刊论文
JOURNAL OF ENGINEERING MATHEMATICS, 2016, 卷号: 100, 期号: 1, 页码: 67-80
作者:
Yang, Fan
;
Fu, Chu-Li
;
Li, Xiao-Xiao
收藏
  |  
浏览/下载:4/0
  |  
提交时间:2019/11/15
A posteriori parameter choice
Error estimate
Identifying time-dependent source
Ill-posedness
Inverse source problem
Mollification methods
Parabolic equation
A mollification regularization method for unknown source in time-fractional diffusion equation
期刊论文
INTERNATIONAL JOURNAL OF COMPUTER MATHEMATICS, 2014, 卷号: 91, 期号: 7, 页码: 1516-1534
作者:
Yang, F
;
Fu, CL
;
Li, XX
收藏
  |  
浏览/下载:4/0
  |  
提交时间:2016/07/28
time-dependent heat source
time-fractional diffusion equation
modified regularization
a posteriori parameter choice
error estimate
A mollification regularization method for the inverse spatial-dependent heat source problem
期刊论文
JOURNAL OF COMPUTATIONAL AND APPLIED MATHEMATICS, 2014, 卷号: 255, 页码: 555-567
作者:
Yang, F
;
Fu, CL
收藏
  |  
浏览/下载:3/0
  |  
提交时间:2015/12/16
Spatial-dependent heat source
Mollification method
A posteriori parameter choice
Error estimate
A mollification regularization method for unknown source in time-fractional diffusion equation
期刊论文
INTERNATIONAL JOURNAL OF COMPUTER MATHEMATICS, 2014, 卷号: 91, 期号: 7, 页码: 1516-1534
作者:
Yang, Fan
;
Fu, Chu-Li
;
Li, Xiao-Xiao
收藏
  |  
浏览/下载:11/0
  |  
提交时间:2019/11/15
time-dependent heat source
time-fractional diffusion equation
modified regularization
a posteriori parameter choice
error estimate
A mollification regularization method for the inverse spatial-dependent heat source problem
期刊论文
JOURNAL OF COMPUTATIONAL AND APPLIED MATHEMATICS, 2014, 卷号: 255, 页码: 555-567
作者:
Yang, Fan
;
Fu, Chu-Li
收藏
  |  
浏览/下载:7/0
  |  
提交时间:2019/11/15
Spatial-dependent heat source
Mollification method
A posteriori parameter choice
Error estimate
A mollification method for a Cauchy problem for the Laplace equation
期刊论文
APPLIED MATHEMATICS AND COMPUTATION, 2011, 卷号: 217, 期号: 22, 页码: 9209-9218
作者:
Li, ZP
;
Fu, CL
收藏
  |  
浏览/下载:4/0
  |  
提交时间:2015/12/16
Cauchy problem for Laplace equation
Ill-posed problem
Regularization
Mollification method
Error estimate
A mollification regularization method for stable analytic continuation
期刊论文
MATHEMATICS AND COMPUTERS IN SIMULATION, 2011, 卷号: 81, 期号: 8, 页码: 1593-1608
作者:
Deng, ZL
;
Fu, CL
;
Feng, XL
;
Zhang, YX
收藏
  |  
浏览/下载:2/0
  |  
提交时间:2015/12/16
Analytic continuation
III-posed problems
Mollification method
Error estimate
A posteriori
A mollification regularization method for the Cauchy problem of an elliptic equation in a multi-dimensional case
期刊论文
INVERSE PROBLEMS IN SCIENCE AND ENGINEERING, 2010, 卷号: 18, 期号: 7, 页码: 971-982
作者:
Cheng, H
;
Feng, XL
;
Fu, CL
收藏
  |  
浏览/下载:2/0
  |  
提交时间:2015/12/16
Cauchy problem of an elliptic equation
ill-posed problem
mollification method
error estimates
Reconstruction of high order derivatives by new mollification methods
期刊论文
APPLIED MATHEMATICS AND MECHANICS-ENGLISH EDITION, 2008, 卷号: 29, 页码: 769-778
作者:
Zhao Zhen-yu[1]
;
He Guo-qiang[2]
收藏
  |  
浏览/下载:4/0
  |  
提交时间:2019/05/06
ill-posed problem
numerical differentiation
mollification method
L generalized solution
cTSVD method
©版权所有 ©2017 CSpace - Powered by
CSpace