1. Asymptotic homogenization for phase field fracture of heterogeneous materials and application to toughening.
- Author
-
Liu, Sen, Hao, Shourong, and Shen, Yongxing
- Subjects
- *
ASYMPTOTIC homogenization , *FRACTURE mechanics , *FRACTURE toughness , *THRESHOLD energy , *ELASTICITY , *INHOMOGENEOUS materials - Abstract
We propose an asymptotic homogenization framework to simulate the fracture of heterogeneous materials. This framework upscales the phase field model for microscale fracture and yields anisotropic effective properties such as the degraded elasticity tensor and the fracture toughness. Furthermore, it quantitatively accounts for the toughening effect in a simple way. More specifically, when the critical energy release rate of a heterogeneous material is uniform, the framework reveals that toughening is essentially determined by the disparity in the moduli of toughness, the energy per unit volume absorbed by the constituents before cracking. • Asymptotic homogenization for phase field models for fracture. • Both the displacement field and the phase field are upscaled. • Tension-compression asymmetry in the underlying phase field model is incorporated. • Anisotropic fracture toughness tensor obtained with one single computation. • Under uniform fracture toughness, toughening depends on contrast in toughness moduli. [ABSTRACT FROM AUTHOR]
- Published
- 2024
- Full Text
- View/download PDF