Journal article
Numerical analysis of plane cracks in strain-gradient elastic materials
International journal of fracture, Vol.141(3), pp.403-430
10/2006
Handle:
https://hdl.handle.net/2376/394
Abstract
The classical linear elastic fracture mechanics is not valid near the crack tip because of the unrealistic singular stress at the tip. The study of the physical nature of the deformation around the crack tip reveals the dominance of long-range atomic interactive forces. Unlike the classical theory which incorporates only short range forces, a higher-order continuum theory which could predict the effect of long range interactions at a macro scale would be appropriate to understand the deformation around the crack tip. A simplified theory of gradient elasticity proposed by Aifantis is one such grade-2 theory. This theory is used in the present work to numerically analyze plane cracks in strain-gradient elastic materials. Towards this end, a 36 DOF C1 finite element is used to discretize the displacement field. The results show that the crack tip singularity still persists but with a different nature which is physically more reasonable. A smooth closure of the structure of the crack tip is also achieved.
Metrics
6 Record Views
Details
- Title
- Numerical analysis of plane cracks in strain-gradient elastic materials
- Creators
- S Akarapu - School of Mechanical and Materials Engineering Washington State University Pullman WA 99164-2920 USAHussein Zbib - School of Mechanical and Materials Engineering Washington State University Pullman WA 99164-2920 USA
- Publication Details
- International journal of fracture, Vol.141(3), pp.403-430
- Publisher
- Kluwer Academic Publishers; Dordrecht
- Identifiers
- 99900548468301842
- Language
- English
- Resource Type
- Journal article