Analytical and computational aspects of collaborative optimization for multidisciplinary design

被引：138

作者：

Alexandrov, NM

Lewis, RM

机构：

[1] NASA Langley Res Ctr, Multidisciplinary Optimizat Branch, Hampton, VA 23681 USA

[2] Coll William & Mary, Dept Math, Williamsburg, VA 23187 USA

来源：

AIAA JOURNAL | 2002年 / 40卷 / 02期

关键词：

D O I：

10.2514/2.1646

中图分类号：

V [航空、航天];

学科分类号：

08 ; 0825 ;

摘要：

Analytical features of multidisciplinary optimization (MDO) problem formulations have significant practical consequences for the ability of nonlinear programming algorithms to solve the resulting computational optimization problems reliably and efficiently. We explore this important but frequently overlooked fact using the notion of disciplinary autonomy. Disciplinary autonomy is a desirable goal in formulating and solving MDO problems; however, the resulting system optimization problems are frequently difficult to solve. We illustrate the implications of MDO problem formulation for the tractability of the resulting design optimization problem by examining a representative class of MDO problem formulations known as collaborative optimization, We also discuss an alternative problem formulation, distributed analysis optimization, that yields a more tractable computational optimization problem.

引用

页码：301 / 309

页数：9

共 35 条

[1] ADELMAN H, 1992, 924777 AIAA
[2] ALEXANDROV N, 2000, P 8 AIAA USAF NASA I
[3] Alexandrov N.M., 1998, P 7 AIAA USAF NASA I, P1315
[4] Alexandrov N. M., 2000, NASATM2101042000
[5] ALEXANDROV NM, 1999, ENG DESIGN OPTIMIZAT, P39
[6] [Anonymous], 1996, THESIS STANFORD U
[7] Balling R.J., 1994, P 5 S MULT AN OPT PA, P794
[8] BALLING RJ, 1994, P 5 AIAA NASA USAF I, P753
[9] IMPROVED MULTILEVEL OPTIMIZATION APPROACH FOR THE DESIGN OF COMPLEX ENGINEERING SYSTEMS
BARTHELEMY, JFM
RILEY, MF
[J]. AIAA JOURNAL, 1988, 26 (03) : 353 - 360
[10] EXTRAPOLATION OF OPTIMUM DESIGN BASED ON SENSITIVITY DERIVATIVES
BARTHELEMY, JFM
SOBIESZCZANSKISOBIESKI, J
[J]. AIAA JOURNAL, 1983, 21 (05) : 797 - 799

← 1 2 3 4 →