The hydraulic bulge test can be used as a means to achieve large uniform plastic strains under biaxial stress conditions, applied to hardening curve determination of sheet metal materials. The larger information on hardening behaviour is the reason why a mechanical characterization system has been developed to determine stress-strain curve by reading bulge test variables: bulge pressure (p), radius of curvature (ρ) and pole thickness (t). The determination of stress-strain curve may be based on continuous data acquisition from bulge test results (p, ρ, t) or from the use of analytical equations relating these variables with dome height. In this paper it is presented a study comparing different methodologies to obtain stress-strain curve by means of analytical methodologies relating “dome height with pole thickness” evolution. It is shown that these existent methodologies to determine pole thickness don’t apply when compared with experimental values and they show an evident dispersion among them. Therefore a better analytical methodology is proposed and tested. The study and corresponding material characterization is applied to two aluminium alloys, AA5754-T4 and AA6061-T6, currently used in automotive industry.
Información de la revista
Información del artículo
Abstract
Keywords:
Aluminium alloy
sheet metal characterization
bulge test
thickness evolution.
El Texto completo está disponible en PDF
References
[1]
H. Campos, A.D. Santos, B. Martis, K.I.N. Mori, F. Barlat.
Proceedings of WCCM XI – 11th World Congress on Computational Mechanics, pp. 4223-4238
[2]
A.D. Santos, P. Teixeira, F. Barlat, Proceedings of NUMIFORM 2010-10th International Conference on Numerical Methods in Industrial Forming Processes, Pohang, Republic of Korea, June 13-17, 2010, 1252(1), p. 845-852.
[3]
X. Lemoine A. Iancu, G. Ferron, Proceedings of ESAFORM2011-14th International Conference on Materials Forming, Belfast, Ireland, April 27-29, 2011, AIP Conference Proceedings 1353, pp. 1411-1416.
[4]
A.J. Ranta-Eskola.
Int. J. Mech. Sci., 21 (1979), pp. 457
[5]
G.S. Kular, M.J. Hillier.
Int. J. Mech. Sci., 14 (1972), pp. 631
[6]
H. Campos, A.D. Santos, B.M.R. Martins, J.B. Pacheco.
Proceedings of CNME 2014-9° Congresso Nacional de Mecânica Experimental,
[7]
R. Hill.
Philos. Mag., 7 (1950), pp. 1133
[8]
G. Gutscher, H.-C. Wu, G. Ngaile, T. Altan.
J. Mater. Process. Technol., 146 (2004), pp. 1
[9]
M. Koç, E. Billur, Ö.N. Cora.
Mater. Des., 32 (2011), pp. 272
[10]
W. Pankin, PhD thesis, University of Stuttgart, Stuttgart, Germany, 1959.
[11]
L. Lazarescu, D.S. Comşa, D. Banabic, Proceedings of ESAFORM2011-14th International Conference on Materials Forming, Belfast, Ireland, April 27-29, 2011, AIP Conference Proceedings 1353, pp. 1429-1434.
Copyright © 2017. Portuguese Society of Materials (SPM)