Functionally graded materials are regarded as a special kind of composites capable of eliminating material interfaces and the delamination problems. Stress discontinuity can be avoided owing to smooth composition of the functionally graded ingredients. In this study, a recently emerged effective non-local continuum theory for solving fracture problems in solids and structures, peridynamics, is employed to simulate dynamic wave propagation as well as crack propagation in functionally graded materials. Specifically, the ordinary state-based formulation is adopted. The ordinary state-based formulation is slightly modified for the modelling of functionally graded materials. The averaging technique is employed to determine peridynamic parameters...
The behavior of a rapidly moving transient crack in functionally graded materials (FGMs) is investig...
An experimental and analytical study has been conducted to investigate the process of dynamic fractu...
Crack propagation and branching are modeled using nonlocal peridynamic theory. One major advantage o...
Functionally graded materials are regarded as a special kind of composites capable of eliminating ma...
Static and dynamic fracture parameter analyses of functionally graded materials (FGMs) are conducted...
Dynamic crack propagation assessment in functionally graded materials (FGMs) with micro-cracks is ac...
This study investigates the crack initiation and its progression in two-dimensional functionally gra...
Purpose: This study aims to investigate the influence of material distributions on the damage nuclea...
Functional gradient materials (FGMs) have tremendous potential due to their characteristic advantage...
Damage and failure in composite materials under dynamic loading has been extensively studied in expe...
Functionally graded materials (FGMs) are widely used in the aerospace industry, especially for the t...
In the present work, interactions between a macro-crack and various microcrack configurations are st...
Peridynamics is a continuum reformulation of the classical partial differential equations of motion....
The capability to predict damage and crack evolution by using adequate numerical techniques is becom...
The dynamic crack propagation in materials with varying properties, i.e., functionally graded materi...
The behavior of a rapidly moving transient crack in functionally graded materials (FGMs) is investig...
An experimental and analytical study has been conducted to investigate the process of dynamic fractu...
Crack propagation and branching are modeled using nonlocal peridynamic theory. One major advantage o...
Functionally graded materials are regarded as a special kind of composites capable of eliminating ma...
Static and dynamic fracture parameter analyses of functionally graded materials (FGMs) are conducted...
Dynamic crack propagation assessment in functionally graded materials (FGMs) with micro-cracks is ac...
This study investigates the crack initiation and its progression in two-dimensional functionally gra...
Purpose: This study aims to investigate the influence of material distributions on the damage nuclea...
Functional gradient materials (FGMs) have tremendous potential due to their characteristic advantage...
Damage and failure in composite materials under dynamic loading has been extensively studied in expe...
Functionally graded materials (FGMs) are widely used in the aerospace industry, especially for the t...
In the present work, interactions between a macro-crack and various microcrack configurations are st...
Peridynamics is a continuum reformulation of the classical partial differential equations of motion....
The capability to predict damage and crack evolution by using adequate numerical techniques is becom...
The dynamic crack propagation in materials with varying properties, i.e., functionally graded materi...
The behavior of a rapidly moving transient crack in functionally graded materials (FGMs) is investig...
An experimental and analytical study has been conducted to investigate the process of dynamic fractu...
Crack propagation and branching are modeled using nonlocal peridynamic theory. One major advantage o...