Engineering Mechanics and Materials Research in the Information Technology Age

Ken P Chong; Daniel C Davis

Volume 20 Issue 12

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Article Navigation > Applied Mathematics and Mechanics > 1999 > 20(12): 1211-1214

DING Hao-jiang, WANG Hui-ming, CHEN Wei-qiu. A Theoretical Solution of Cylindrical Shells for Axisymmetric Plain Strain Elastodynamic Problems[J]. Applied Mathematics and Mechanics, 2002, 23(2): 128-134.

Citation:

Ken P Chong, Daniel C Davis. Engineering Mechanics and Materials Research in the Information Technology Age[J]. Applied Mathematics and Mechanics, 1999, 20(12): 1211-1214.

Citation:

Ken P Chong, Daniel C Davis. Engineering Mechanics and Materials Research in the Information Technology Age[J]. Applied Mathematics and Mechanics, 1999, 20(12): 1211-1214.

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Engineering Mechanics and Materials Research in the Information Technology Age

Mechanics and Materials Programs, Division of Civil and Mechanical Systems, Directorate for Engineering, National Science Foundation, Arlington V A 22230, USA

Received Date: 1999-08-22
Publish Date: 1999-12-15

Abstract

Abstract

In this paper,importance of information technology research and development for economic growth and prosperity is presented.Major missio of the research for fundamental science and engineering base is discussed.Critical points of the mechanics and materials research in the 21th Century are proposed.
- engineering mechanics,
- materials,
- information technology,
- NSF

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References(5)

References

[1]	Wong E.An economic case for basic research[J].Nature,1996,381:187～188.
[2]	Wong E.Engineering the service industry[DB/OL].http://www.eng.nsf.gov/engnews/1999,1999,5.
[3]	Sack R.Model-Based Simulation[M].white paper.Arlington.VA:National Science Foundation,1999;See also:[www.eng.nsf.gov/cms/]for any update.
[4]	Chong K P.Smart structure research in the U S[A].Keynote paper.In: Proc NATO Adv Res Workshop on Smart Structures,held in Pultusk,Poland,6/98,Smart Structure[C].Kluwer Publ,1999,37～44;See also: Boresi A P,Chong K P.Elasticity in Engineering Mechanics[M].New York,NY: John Wiley,1999;(中文版:Boresi A P,张建平,工程力学中的弹性理论[M].北京:科学出版社,1995.)
[5]	NSF.Long term durability of materials and structures: modeling and accelerated techniques[R].NSF 98-42,Arlington,VA:National Science Foundation,1998.

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