Journal
JOURNAL OF THE MECHANICS AND PHYSICS OF SOLIDS
Volume 179, Issue -, Pages -Publisher
PERGAMON-ELSEVIER SCIENCE LTD
DOI: 10.1016/j.jmps.2023.105365
Keywords
Ductile fracture; Porous materials; Necklace coalescence; Internal necking; Strain localization; Hill plasticity; Crystal plasticity
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Ductile fracture in metallic alloys occurs through the growth and coalescence of cavities. Different forms of coalescence can develop, including internal necking, coalescence in columns, and void sheeting. This study investigates the transition from homogeneous yielding to inhomogeneous yielding modes in anisotropic porous materials, considering plastic anisotropy and void shape effects. Analytical yield criteria obtained through kinematic limit analysis are compared to numerical simulations, showing qualitative agreement. Additionally, a homogenized model for Hill porous materials is developed, incorporating evolution laws for microstructural parameters derived from sequential limit analysis.
Ductile fracture in metallic alloys occurs by growth and coalescence of cavities. Growth, also referred to as homogeneous yielding, refers to rather diffuse plasticity around cavities, while coalescence, also termed as inhomogenous yielding, corresponds to the localization of plasticity along some planes or directions. Coalescence can develop in various patterns; three coalescence modes have been observed experimentally: internal necking, coalescence in columns and void sheeting. Plastic anisotropy of the material is known to have a significant effect on both homogeneous and inhomogeneous yielding. Therefore, in the present study, yield criteria accounting for the transition from homogeneous yielding to inhomogeneous yielding modes in anisotropic porous materials are obtained using kinematic limit analysis on a cylindrical unit cell with a coaxial cylindrical cavity. Two types of plastic anisotropy are considered: Hill (1948) plasticity and crystal plasticity. The proposed analytical yield criteria are compared to numerical limit analysis computations and are found to qualitatively agree with simulations. In particular, plastic anisotropy, void shape effects and their coupling are well captured, especially regarding yield stresses and deformation modes. Finally, an homogenized model for Hill porous materials is obtained by supplementing evolution laws for microstructural parameters (void aspect ratio and ligament size ratios) derived from sequential limit analysis. Proposed evolution laws are then discussed in the light of numerical results and experimental evidence.
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