A numerical study of the return mapping application for the subloading surface model
Abstract
Purpose
Many practical problems in engineering require fast, accurate numerical results. In particular, in cyclic plasticity or fatigue simulations, the high number of loading cycles increases the computation effort and time. The purpose of this study is to show that the return mapping technique in the framework of unconventional plasticity theories is a good compromise between efficiency and accuracy in finite element analyses.
Design/methodology/approach
The accuracy of the closest point projection method and the cutting plane method implementations for the subloading surface model are discussed under different loading conditions by analyzing the error as a function of the input step size and the efficiency of the algorithms.
Findings
Monotonic tests show that the two different implicit integration schemes have the same accuracy and are in good agreement with the solution obtained using an explicit forward Euler scheme, even for large input steps. However, the closest point projection method seems to describe better the evolution of the similarity centre in the cyclic loading analyses.
Practical implications
The purpose of this work is to show two alternative implicit integration schemes of the extended subloading surface method for metallic materials. The backward Euler integrations can guarantee a good description of the material behaviour and, at the same time, reduce the computational cost. This aspect is particularly important in the field of low or high cycle fatigue, because of the large number of cycles involved.
Originality/value
A detailed description of both the cutting plane and closest point projection methods is offered in this work. In particular, the two integrations schemes are compared in terms of accuracy and computation time for monotonic and cyclic loading tests.
Keywords
Citation
Fincato, R. and Tsutsumi, S. (2018), "A numerical study of the return mapping application for the subloading surface model", Engineering Computations, Vol. 35 No. 3, pp. 1314-1343. https://doi.org/10.1108/EC-12-2016-0446
Publisher
:Emerald Publishing Limited
Copyright © 2018, Emerald Publishing Limited