Review of Computational Approaches to Optimization Problems in Inhomogeneous Rods and Plates

被引：0

作者：

Chen, Weitao ^{[1
]}

Kao, Chiu-Yen ^{[2
]}

机构：

[1] Univ Calif Riverside, Dept Math, 900 Univ Ave, Riverside, CA 92521 USA

[2] Claremont McKenna Coll, Dept Math Sci, 850 Columbia Ave, Claremont, CA 91711 USA

来源：

COMMUNICATIONS ON APPLIED MATHEMATICS AND COMPUTATION | 2024年 / 6卷 / 01期

关键词：

Inhomogeneous rods and plates; Bi-Laplacian; Optimization of eigenvalues; Localization of eigenfunctions; Rearrangement; 1ST EIGENVALUE; EIGENFUNCTIONS; LOCALIZATION; EQUATION; CHLADNI;

D O I：

10.1007/s42967-022-00242-w

中图分类号：

O29 [应用数学];

学科分类号：

070104 ;

摘要：

In this paper, we review computational approaches to optimization problems of inhomogeneous rods and plates. We consider both the optimization of eigenvalues and the localization of eigenfunctions. These problems are motivated by physical problems including the determination of the extremum of the fundamental vibration frequency and the localization of the vibration displacement. We demonstrate how an iterative rearrangement approach and a gradient descent approach with projection can successfully solve these optimization problems under different boundary conditions with different densities given.

引用

页码：236 / 256

页数：21

共 50 条

[11] Nonsmooth boundary value problems in theory of rods, plates, and shells
Tarasov V.N.
Journal of Mathematical Sciences, 2015, 205 (2) : 308 - 334
[12] SCALAR BOUNDARY VALUE PROBLEMS ON JUNCTIONS OF THIN RODS AND PLATES
Bunoiu, R.
Cardone, G.
Nazarov, S. A.
ESAIM-MATHEMATICAL MODELLING AND NUMERICAL ANALYSIS, 2014, 48 (05) : 1495 - 1528
[13] CONTACT PROBLEMS FOR BANDS AND RECTANGULAR-PLATES, STRENGTHENED BY RODS
NULLER, BM
PRIKLADNAYA MATEMATIKA I MEKHANIKA, 1975, 39 (03): : 559 - 564
[14] NECESSARY CONDITIONS OF OPTIMALITY FOR PROBLEMS OF RODS OPTIMIZATION
GRINEV, VB
DOPOVIDI AKADEMII NAUK UKRAINSKOI RSR SERIYA B-GEOLOGICHNI KHIMICHNI TA BIOLOGICHNI NAUKI, 1978, (07): : 606 - 609
[15] NECESSARY CONDITIONS OF OPTIMALITY FOR PROBLEMS OF RODS OPTIMIZATION
GRINEV, VB
DOPOVIDI AKADEMII NAUK UKRAINSKOI RSR SERIYA A-FIZIKO-MATEMATICHNI TA TECHNICHNI NAUKI, 1978, (07): : 606 - 609
[16] Comparison of three approaches to studying stability of solutions to problems of discrete optimization and computational geometry
Gordeev E.N.
Journal of Applied and Industrial Mathematics, 2015, 9 (03) : 358 - 366
[17] Computational approaches to critical engineering problems
Horvath, Imre
Duhovnik, Joze
STROJNISKI VESTNIK-JOURNAL OF MECHANICAL ENGINEERING, 2007, 53 (7-8): : 424 - 428
[18] A naturally parallelizable computational method for inhomogeneous parabolic problems
Ganesh, M
Sheen, D
CMES-COMPUTER MODELING IN ENGINEERING & SCIENCES, 2001, 2 (02): : 183 - 193
[19] A Review of Dynamic Modeling Approaches and Their Application in Computational Strain Optimization for Metabolic Engineering
Kim, Osvaldo D.
Rocha, Miguel
Maia, Paulo
FRONTIERS IN MICROBIOLOGY, 2018, 9
[20] Finite Integral Transform Method in Static Problems for Inhomogeneous Plates
Bespalova T.I.
Bespalova, T.I., 1600, Springer Science and Business Media, LLC (50): : 651 - 663

← 1 2 3 4 5 →