«Previous Article|Table of Contents|Next Article»

《建筑科学与工程学报》[ISSN:1673-2049/CN:61-1442/TU]

Issue:

2009年02期

Page:

103-108

Research Field:

Publishing date:

2009-06-20

Info

Title:

Analysis for Buckling Behavior of Multi-step Rectangular Section Compressive Columns with Arbitrary Number of Side-cracks

Author(s):

ZHOU Li

Department of Civil Engineering, Wuyi University, Jiangmen 529020, Guangdong, China

Keywords:

buckling behavior;  arbitrary number of crack;  rectangular section;  multi-step column;  equilibrium path model;  lateral interfering deflection

PACS:

TU375.1

DOI:

-

Abstract:

The governing equation for the post-buckling process of a multi-step rectangular section compressive column with arbitrary number of side-cracks was derived by using Rayleigh-Ritz energy method. Moreover, an analytical model of the equilibrium path of whole buckling process was suggested for the cracked compressive column, where the crack closure and fracture condition were considered. Thus the unreasonable conclusions in some relevant references that cracks had certainly effects on critical load were corrected. As an example, the equilibrium path curves of four states of cracks were obtained numerically for a simply supported three-steps columns. The analytical results show that when an excessive lateral interfering deflection appears, the cracks will have effects on critical load; when the lateral interfering deflection is small, the cracks will have no effects on critical load but have effects on post-buckling process.

References:

[1] DIMAROGONAS A D.Vibration of Cracked Structures-a State of the Art Review[J].Engineering Fracture Mechanics,1996,55(5):831-857.
[2]OKAMURA H,LIU H W,CHU C S,et al.A Cracked Column Under Compression[J].Engineering Fracture Mechanics,1969,1(1):547-564.
[3]ISMAIL F,IBRAHIM A,MARTIN H R.Identification of Fatigue Cracks from Vibration Testing[J].Journal of Sound and Vibration,1990,140(2):305-317.
[4]KRAWCZUK M,OSTACHOWICZ W,ZAK A.Dynamics of Cracked Composite Material Structures[J].Computational Mechanics,1997,20(1/2):79-83.
[5]TAKAHASHI H.Vibration and Stability of Non-uniform Cracked Timoshenko Beam Subjected to Follower Force[J].Computers & Structures,1999,71(5):585-591.
[6]ANIFANTIS A,DIMAROGONAS A D.Stability of Columns with a Single Crack Subjected to Follower and Vertical Loads[J].International Journal of Solids and Structures,1983,19(4):281-291.
[7]NIKPOUR K.Buckling of Cracked Composite Columns[J].International Journal of Solids and Structures,1990,26(12):1371-1386.
[8]WANG Q,CHASE J G.Buckling Analysis of Cracked Column Structures and Piezoelectric-based Repair and Enhancement of Axial Load Capacity[J].International Journal of Structural Stability and Dynamics,2003,3(1):17-34.
[9]SHIFRIN E I,RUOTOLO R.Nature Frequencies of a Beam with an Arbitrary Number of Cracks[J].Journal of Sound and Vibration,1999,222(3):409-423.
[10]LI Q S.Class of Exact Solutions for Buckling of Multistep Nonuniform Columns with an Arbitrary Number of Cracks Subjected to Concentrated and Distributed Axial Loads[J].Int Eng Sci,2003,41:569-586.
[11]LI Q S.Vibratory Characteristics of Timoshenko Beam with an Arbitrary Number of Cracks[J].Journal of Engineering Mechanics,2003,129(11):1355-1359.
[12]GOUNARIS G,DIMARAGONAS A D.A Finite Element of a Cracked Prismatic Beam for Structural Analysis[J].Comput Struct,1988,28(3):309-313.
[13]VIOLA E,NOBILE L,FEDERICI L.Formulation of Cracked Beam Element for Structural Analysis[J].Journal of Engineering Mechanics,2002,128(2):220-230.

Memo

Memo:

-

Common functions

Last Update: 2009-06-20