Influence of the sensitivity of plastic deformation to the third invariant on the stress state achievable during stretch forming of isotropic materials

IF 2.6 3区材料科学 Q2 ENGINEERING, MANUFACTURING

International Journal of Material Forming Pub Date : 2024-05-02 DOI:10.1007/s12289-024-01830-2

Hernan Godoy, Benoit Revil-Baudard, Oana Cazacu

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Abstract

For isotropic materials, the von Mises yield criterion is generally used to interpret bulge test data and assess formability. In this paper, we investigate the role played by the \({J}_{3}\) dependence of the plastic response on the behavior during stretch forming under pressure. To this end, we consider the isotropic yield criterion of Drucker, which involves a unique parameter c expressible solely in terms of the ratio between the yield stresses in shear and uniaxial tension, \({\tau }_{Y}/{\sigma }_{T}\). In the case when \({\tau }_{Y}/{\sigma }_{T}=\sqrt{3}\), the parameter c = 0 and the von Mises yield criterion is recovered, otherwise Drucker’s criterion accounts for dependence on both \({J}_{2}\) and \({J}_{3}\). First, an analytical estimate of the ratio of the principal stresses at the apex of the dome is deduced. It is demonstrated that the stress ratio depends on the parameter c, the deviation from an equibiaxial stress state induced by changing the die aspect ratio is more pronounced for materials with higher \({\tau }_{Y}/{\sigma }_{Y}\) ratio. Finite element predictions using the yield criterion and isotropic hardening confirm the trends put into evidence theoretically. Moreover, the F.E. simulations show that there is a correlation between the value of the parameter c that describes the dependence on \({J}_{3}\) in the model and the strain paths that can be achieved in any given test, the level of plastic strains that develop in the dome, and the thickness reduction. Specifically, for a material characterized by c > 0 (\({\tau }_{Y}/{\sigma }_{T}<1/\sqrt{3}\)) under elliptical bulging, at the apex the plastic strain ratio is greater than in the case of a von Mises material, while the stress ratio is less. On the other hand, for a material characterized by c < 0 (\({\tau }_{Y}/{\sigma }_{T}>1/\sqrt{3}\)), the reverse holds true. The FE results also suggest that for certain isotropic materials neglecting the dependence of their plastic behavior on \({J}_{3}\) would lead to an underestimation of the thickness reduction.

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塑性变形对第三不变量的敏感性对各向同性材料拉伸成形过程中可达到的应力状态的影响

对于各向同性材料，通常使用 von Mises 屈服准则来解释隆起试验数据和评估可成形性。在本文中，我们研究了塑性响应的 \({J}_{3}\) 依赖性对压力下拉伸成形过程中的行为所起的作用。为此，我们考虑了 Drucker 的各向同性屈服准则，它涉及一个唯一的参数 c，该参数只能用剪切屈服应力和单轴拉伸屈服应力之间的比率来表示，即 \({\tau }_{Y}/{\sigma }_{T}\)。在 \({\tau }_{Y}/{\sigma }_{T}=\sqrt{3}\) 的情况下，参数 c = 0，冯-米塞斯屈服准则得到恢复，否则德鲁克准则会考虑到 \({J}_{2}\) 和 \({J}_{3}\) 的依赖性。首先，对穹顶顶点的主应力比进行了分析估计。结果表明，应力比取决于参数 c，对于具有较高 \({\tau }_{Y}/{\sigma }_{Y}\) 比率的材料，改变模具纵横比所引起的等轴应力状态偏差更为明显。使用屈服准则和各向同性硬化进行的有限元预测证实了理论上的趋势。此外，有限元模拟表明，模型中描述对 \({J}_{3}\) 的依赖性的参数 c 值与任何给定试验中可实现的应变路径、圆顶中产生的塑性应变水平以及厚度减小之间存在相关性。具体来说，对于在椭圆隆起条件下以 c > 0 (\({\tau }_{Y}/\{sigma }_{T}<1/\sqrt{3}\))为特征的材料，在顶点处的塑性应变比大于 von Mises 材料，而应力比则较小。另一方面，对于以 c < 0 (\({\tau }_{Y}/{\sigma }_{T}>1/\sqrt{3}\))为特征的材料，情况正好相反。FE 结果还表明，对于某些各向同性材料，忽略其塑性行为对 \({J}_{3}\) 的依赖性会导致低估厚度的减少。

本文章由计算机程序翻译，如有差异，请以英文原文为准。

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来源期刊

International Journal of Material Forming ENGINEERING, MANUFACTURING-MATERIALS SCIENCE, MULTIDISCIPLINARY

CiteScore

5.10

自引率

4.20%

发文量

审稿时长

>12 weeks

期刊介绍： The Journal publishes and disseminates original research in the field of material forming. The research should constitute major achievements in the understanding, modeling or simulation of material forming processes. In this respect ‘forming’ implies a deliberate deformation of material. The journal establishes a platform of communication between engineers and scientists, covering all forming processes, including sheet forming, bulk forming, powder forming, forming in near-melt conditions (injection moulding, thixoforming, film blowing etc.), micro-forming, hydro-forming, thermo-forming, incremental forming etc. Other manufacturing technologies like machining and cutting can be included if the focus of the work is on plastic deformations. All materials (metals, ceramics, polymers, composites, glass, wood, fibre reinforced materials, materials in food processing, biomaterials, nano-materials, shape memory alloys etc.) and approaches (micro-macro modelling, thermo-mechanical modelling, numerical simulation including new and advanced numerical strategies, experimental analysis, inverse analysis, model identification, optimization, design and control of forming tools and machines, wear and friction, mechanical behavior and formability of materials etc.) are concerned.