A new model for springback, based on isotropic and kinematic hardening models, the Mroz multiple surfaces model, and observations from experimental data, is proposed in this paper. In this model, a material parameter (CM), which is significant after reverse yielding, is suggested to handle the Bauschinger effect. A simple, low-cost, multiple-bending experiment has been developed to determine CM for aluminum alloys AA6022-T4 and AA6111-T4. The new model fits available experimental results better than the isotropic and kinematic hardening models and the Mroz multiple surfaces model.

Issue Section:
Research Papers
Keywords:
aluminium, aluminium alloys, sheet materials, sheet metal processing, hardening, Bauschinger effect, bending
Topics:
Aluminum, Deformation, Hardening, Stress, Kinematics, Sheet metal, Clearances (Engineering)
1.
Gau
,
J.-T.
, and
Kinzel
,
G. L.
, 2001, “
An Experimental Investigation of the Influence of the Bauschinger Effect on Springback Predictions
,”
J. Mater. Process. Technol.
0924-0136,
108
, pp.
369
375
.
Crossref
Search ADS
 
2.
Abel
,
A.
, and
Muir
,
H.
, 1972, “
The Bauschinger Effect and Discontinuous Yielding
,”
Philos. Mag.
0031-8086,
26
, pp.
489
504
.
Crossref
Search ADS
 
3.
Sowerby
,
R.
, and
Uko
,
D. K.
, 1979, “
A Review of Certain Aspects of the Bauschinger effect in Metals
,”
Mater. Sci. Eng.
0025-5416,
41
, pp.
43
58
.
Crossref
Search ADS
 
4.
Bate
,
P. S.
, and
Wilson
,
D. V.
, 1986, “
Analysis of The Bauschinger Effect
,”
Acta Metall.
0001-6160,
34
(
6
), pp.
1097
1105
.
Crossref
Search ADS
 
5.
Fenoglietto
,
F.
,
Morestin
,
F.
,
Boivin
,
M.
, and
Deng
,
X.
, 1995, “
Springback Analysis in Orthotrpic Sheet Metal Forming With An Elasto Plastic Formulation Using A Kinematic Hardening Model
,” in
Simulation of Materials and Applications
,
Shen
 and
Dawson
 (eds.) ISBN 90 5410 5534, AaBalkema, Boston, pp.
699
704
.
6.
Pourboghrat
,
F.
, and
Chu
,
E.
, 1995, “
Springback in Plane Strain Stretch/Draw Sheet Forming
,”
Int. J. Mech. Sci.
0020-7403,
36
(
3
), pp.
327
341
.
Crossref
Search ADS
 
7.
Kuwabara
,
T.
,
Takahashi
,
S.
,
Akiyama
,
K.
, and
Ito
,
K.
, 1996, “
Springback Analysis of Sheet Metal subjected to Bending-Unbending under Tension (parts I and II)
,”
Adv. Technol. Plasticity
, Proc. 5th ICTP,
T.
Altan
, ed., pp.
743
750
.
8.
Morestin
,
F.
,
Boivin
,
M.
, and
Silva
,
C.
, 1996, “
Elasto Plastic Formulation Using A Kinematic Hardening Model For Springback Analysis In Sheet Metal Forming
,”
J. Mater. Process. Technol.
0924-0136,
56
, pp.
619
630
.
Crossref
Search ADS
 
9.
Zhang
,
Z. T.
, and
Hu
,
S. J.
, 1998, “
Stress and Residual Stress Distributions in Plane Strain Bending
,”
Int. J. Mech. Sci.
0020-7403,
40
(
6
), pp.
533
553
.
Crossref
Search ADS
 
10.
Gau
,
J.-T.
, and
Kinzel
,
G. L.
, 2001, “
A New Model for Springback Prediction in Which the Bauschinger Effect Is Considered
,”
Int. J. Mech. Sci.
0020-7403,
43
, pp.
1813
1832
.
Crossref
Search ADS
 
11.
Mroz
,
Z.
, 1967, “
On The Description Of Anisotropic Work Hardening
,”
J. Mech. Phys. Solids
0022-5096,
15
, pp.
163
175
.
Crossref
Search ADS
 
12.
Mroz
,
Z.
, 1969, “
An Attempt To Describe The Behavior Of Metal Under Cyclic Loads Using A More General Work Harding Model
,”
Acta Mech.
0001-5970,
7
, pp.
199
212
.
Crossref
Search ADS
 
13.
Chu
,
C. C.
, 1984, “
A Three-dimensional Model of Anisotropic Hardening in Metals and Its Application to the Analysis of Sheet Metal Formability
,”
Int. J. Mech. Phys. Solids Mech. Sci.
,
32
(
3
), pp.
197
212
.
Crossref
Search ADS
 
14.
Hill
,
R.
, 1950,
The Mathematical Theory of Plasticity
,
Oxford University Press
, London.
15.
Hodge
,
P.
, 1957, ”
Discussion of the Prager Hardening Law
,”
ASME J. Appl. Mech.
0021-8936,
24
, pp.
482
484
.
16.
Carden
,
W. D.
, 1997, “
Springback After Drawing and Bending of Metal Sheets
,” M.S. thesis, The Ohio State University.
Copyright © 2005
 by American Society of Mechanical Engineers
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