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Nonlocal layerwise formulation for interfacial tractions in layered nanobeams
- Source :
- Mechanics Research Communications. 109:103595
- Publication Year :
- 2020
- Publisher :
- Elsevier BV, 2020.
-
Abstract
- Interfacial tractions generated at the interface in two-layered nanobeams are studied through the stress-driven nonlocal theory of elasticity and an interface model. The model uses a layerwise description of the problem and satisfies the continuity conditions at the interface. The size-dependency are incorporated into formulation through a nonlocal constitutive law which defines the strain at each point as an integral convolution in terms of the stresses in all the points and a kernel. The Bernoulli-Euler beam theory is used separately for each layer to describe kinematic field, and to derive size-dependent system of coupled governing equations. The displacement components within the layers are derived and the interfacial tractions are obtained through the interfacial constitutive relations. Results are presented for the interfacial shear and normal tractions, exhibiting a different behavior at the nano-scale compared to those of the layered beams with large-scale dimensions including different maximum interfacial tractions and the location where maxima occur. A superior resistance of nanobeams against debondings and delaminations due to the interfacial normal tractions compared to that of the beams with large-scale dimensions is observed. The formulation and the understandings presented here are expected to stimulate further researches on multilayered nanobeams, including their interfacial fracture mechanics.
- Subjects :
- Timoshenko beam theory
Materials science
Interface model
Interfacial tractions
Constitutive equation
Delamination
Multilayered nanobeams
Nonlocal elasticity
Weak bonding
02 engineering and technology
Kinematics
01 natural sciences
010305 fluids & plasmas
0203 mechanical engineering
0103 physical sciences
General Materials Science
Civil and Structural Engineering
Mechanical Engineering
Mechanics
Elasticity (physics)
Condensed Matter Physics
020303 mechanical engineering & transports
Interfacial shear
Mechanics of Materials
Interfacial fracture
Maxima
Subjects
Details
- ISSN :
- 00936413
- Volume :
- 109
- Database :
- OpenAIRE
- Journal :
- Mechanics Research Communications
- Accession number :
- edsair.doi.dedup.....a24b1c69ac77bb2f4dda3ed90187e555
- Full Text :
- https://doi.org/10.1016/j.mechrescom.2020.103595