LEAST-SQUARES METHODS FOR OPTIMAL SHAPE DESIGN-PROBLEMS

被引:13
作者
BEDIVAN, DM
FIX, GJ
机构
[1] Department of Mathematics, The University of Texas at Arlington, Arlington, TX 76019-0408
来源
COMPUTERS & MATHEMATICS WITH APPLICATIONS | 1995年 / 30卷 / 02期
关键词
LEAST SQUARES; FINITE ELEMENT; OPTIMAL SHAPE DESIGN; FREE BOUNDARY PROBLEM; SEMICONDUCTOR PROBLEM;
D O I
10.1016/0898-1221(95)00074-9
中图分类号
O29 [应用数学];
学科分类号
070104 ;
摘要
A Least-Squares method for solving an optimal shape design problem which appears in semiconductor device physics is described. Discretization by finite element methods is used for numerical solving. An example and experimental results are presented.
引用
收藏
页码:17 / 25
页数:9
相关论文
共 50 条
[1]   The shape gradient of the least-squares objective functional in optimal shape design problems of radiative heat transfer [J].
Rukolaine, Sergey A. .
JOURNAL OF QUANTITATIVE SPECTROSCOPY & RADIATIVE TRANSFER, 2010, 111 (16) :2390-2404
[2]   A NOTE ON PRECONDITIONED ITERATIVE METHODS FOR LEAST-SQUARES PROBLEMS [J].
EVANS, DJ ;
YUAN, J .
INTERNATIONAL JOURNAL OF COMPUTER MATHEMATICS, 1995, 55 (3-4) :245-251
[3]   Near optimal solutions to least-squares problems with stochastic uncertainty [J].
Calafiore, G ;
Dabbene, F .
SYSTEMS & CONTROL LETTERS, 2005, 54 (12) :1219-1232
[4]   Split least-squares finite element methods for linear and nonlinear parabolic problems [J].
Rui, Hongxing ;
Kim, Sang Dong ;
Kim, Seokchan .
JOURNAL OF COMPUTATIONAL AND APPLIED MATHEMATICS, 2009, 223 (02) :938-952
[5]   Existence of a solution for complete least squares optimal shape problems [J].
Bedivan, DM .
NUMERICAL FUNCTIONAL ANALYSIS AND OPTIMIZATION, 1997, 18 (5-6) :495-505
[6]   A comparative study of least-squares, SUPG and Galerkin methods for convection problems [J].
Bochev, PB ;
Choi, J .
INTERNATIONAL JOURNAL OF COMPUTATIONAL FLUID DYNAMICS, 2001, 15 (02) :127-146
[7]   Least-squares methods for Navier-Stokes boundary control problems [J].
Bochev, PB ;
Bedivan, DM .
INTERNATIONAL JOURNAL OF COMPUTATIONAL FLUID DYNAMICS, 1997, 9 (01) :43-58
[8]   On mass conservation in least-squares methods [J].
Bolton, P ;
Thatcher, RW .
JOURNAL OF COMPUTATIONAL PHYSICS, 2005, 203 (01) :287-304
[9]   A least-squares/penalty method for distributed optimal control problems for Stokes equations [J].
Choi, Youngmi ;
Lee, Hyung-Chun ;
Shin, Byeong-Chun .
COMPUTERS & MATHEMATICS WITH APPLICATIONS, 2007, 53 (11) :1672-1685
[10]   Optimal rates for the regularized least-squares algorithm [J].
Caponnetto, A. ;
De Vito, E. .
FOUNDATIONS OF COMPUTATIONAL MATHEMATICS, 2007, 7 (03) :331-368
12345