考虑尺寸效应的厚壁圆筒统一塑性极限解

doi:10.3785/j.issn.1008-973X.2011.04.016

2011, Vol. 45

Issue (4): 684-687 DOI: 10.3785/j.issn.1008-973X.2011.04.016

土木工程、建筑工程

考虑尺寸效应的厚壁圆筒统一塑性极限解

高洪伟1, 何丽莎1, 张永强2

1.浙江大学航空航天学院,浙江杭州310027; 2.浙江大学建筑工程学院，浙江杭州 310012

Unified plastic limit solution for thick-walled cylinder with size effect

GAO Hong-wei1, HE Li-sha1, ZHANG Yong-qiang2

1. School of Aeronautics and Astronautics, Zhejiang University, Hangzhou 310027, China; 2. College of
Civil Engineering and Architecture, Zhejiang University, Hangzhou 310012, China

全文: PDF HTML

摘要：

为了扩大传统厚壁圆筒塑性极限理论的应用范围,基于俞茂宏统一屈服准则和应变梯度塑性理论,对由拉压强度相等的线性硬化材料组成的受内压厚壁圆筒进行塑性极限分析,得到考虑尺寸效应的厚壁圆筒统一塑性极限解.该统一解可以适用于各种拉压强度相等的材料,现有相应的传统解均为它的特例.利用得到的统一解,分析圆筒塑性极限荷载的尺寸效应.结果表明,当厚壁圆筒的特征尺寸为μm量级时,塑性极限荷载有显著的尺寸效应.研究厚壁圆筒塑性极限荷载和材料硬化程度的关系,发现塑性极限荷载随着材料的硬化程度增加而增大.

Abstract:

In order to expand the application of the classical plastic limit theory for thick-walled cylinder, a plastic limit analysis was conducted by using the unified yield criterion and a strain gradient plasticity theory for an internally pressurized thickwalled cylinder of elastic linear-hardening plastic material with the same tension-compression strength. A unified plastic limit solution with size effect was derived in a closed form, which was adapted to various materials with the same tension-compression strength, and the classical plasticity solution can be recovered as a special case of it. The size effect of strain-hardening level on the load-carrying capacity was analyzed based on the unified solution. Results showed that the size effect was significant as the characteristic length was in the level of micrometer. The relationship between the plastic limit loading and the material hardening level was analyzed. Results showed that the plastic limit loading increased with the increase of hardening level.

出版日期: 2011-05-05

O 344

通讯作者: 张永强,男,教授,博导. E-mail: cyqzhang@zju.edu.cn

作者简介: 高洪伟(1983—),男,浙江湖州人,硕士生,从事材料弹塑性理论的研究.E-mail: ymytiamo2222@163.com

	服务
	把本文推荐给朋友
	加入引用管理器
	E-mail Alert
	RSS
	作者相关文章

引用本文:

高洪伟, 何丽莎, 张永强. 考虑尺寸效应的厚壁圆筒统一塑性极限解[J]. J4, 2011, 45(4): 684-687.

GAO Hong-wei, HE Li-sha, ZHANG Yong-qiang. Unified plastic limit solution for thick-walled cylinder with size effect. J4, 2011, 45(4): 684-687.

链接本文:

http://www.zjujournals.com/eng/CN/10.3785/j.issn.1008-973X.2011.04.016 或 http://www.zjujournals.com/eng/CN/Y2011/V45/I4/684

［1］ HILL R. The mathematical theory of plasticity ［M］. Oxford: Clarendon Press, 1950: 106-113.
［2］庄锦华.拉压性能不同材料厚壁圆筒与厚壁球壳的极限压力分析［J］.力学与实践,1998,20(4): 38-41.
ZHUANG Jinhua. The analysis of limit inner pressure of thickwalled tube and sphere shell with different strength in tension and compression ［J］. Mechanics and Engineering, 1998, 20(4): 38-41.
［3］王钟羡.用双剪强度理论对厚壁圆筒的极限分析［J］.江苏理工大学学报,1997,18(2): 81-84.
WANG Zhongxian. The limit analysis of thickwalled cylinder with the twinshear strength theory ［J］. Journal of Jiangsu Science and Technological University, 1997, 18(2): 81-84.
［4］赵均海,张永强.用统一强度理论求厚壁圆筒和厚壁球壳的极限解\
[J\].应用力学学报.2000,17(1): 157-161.
ZHAO Junhai, ZHANG Yongqiang. The limit solution of thickwalled cylinder and spherical shell with reference to the unified strength theory ［J］. Chinese Journal of Applied Mechanics, 2000, 17(1): 157-161.
［5］ SWADENER J G, GEORGE E P, PHARR G M. The correlation of the indentation size effect measured with indenters of various shapes ［J］. Journal of the Mechanics and Physics of Solids, 2002, 50(4): 681-694.
［6］ GAO X L. Strain gradient plasticity solution for an internally pressurized thickwalled cylinder of an elastic linearhardening material ［J］. Zeitschrift fur Angewandte Mathematik und Physik, 2007, 58(1): 161-173.
［7］俞茂宏.双剪理论及其应用［M］.北京:科学出版社,1998: 68-70.
［8］ MUHLHAUS H B, AIFANTIS E C. A variational principle for gradient plasticity ［J］. International Journal of Solids and Structures, 1991, 28(7): 845-857.
［9］余同希.塑性力学［M］.北京:高等教育出版社,1989: 151-162.
［10］俞茂宏,杨松岩,刘春阳.统一平面应变滑移线场理论［J］.土木工程学报,1997,30(2): 14-26.
YU Maohong, YANG Songyan, LIU Chunyang. The unified plane strain slip line field theory system ［J］. China Civil Engineering Journal, 1997, 30(2): 14-26.
［11］陈明祥.弹塑性力学［M］.北京:科学出版社,2007: 297-302.

[1]	蒋军, 徐正红, 徐凌峰. 颗粒体材料中的力链压曲变形[J]. J4, 2010, 44(10): 1931-1937.

Viewed

Full text

Abstract

Cited

Shared

Discussed