Buckling Behavior of Nanobeams Placed in Electromagnetic Field Using Shifted Chebyshev Polynomials-Based Rayleigh-Ritz Method
Published 2019 View Full Article
- Home
- Publications
- Publication Search
- Publication Details
Title
Buckling Behavior of Nanobeams Placed in Electromagnetic Field Using Shifted Chebyshev Polynomials-Based Rayleigh-Ritz Method
Authors
Keywords
-
Journal
Nanomaterials
Volume 9, Issue 9, Pages 1326
Publisher
MDPI AG
Online
2019-09-16
DOI
10.3390/nano9091326
References
Ask authors/readers for more resources
Related references
Note: Only part of the references are listed.- A novel fractional nonlocal model and its application in buckling analysis of Euler-Bernoulli nanobeam
- (2019) Subrat Kumar Jena et al. Materials Research Express
- Dynamic modeling of non-cylindrical curved viscoelastic single-walled carbon nanotubes based on the second gradient theory
- (2019) Mohammad Malikan et al. Materials Research Express
- Vibration characteristics of nanobeam with exponentially varying flexural rigidity resting on linearly varying elastic foundation using differential quadrature method
- (2019) Subrat Kumar Jena et al. Materials Research Express
- Dynamical behavior of nanobeam embedded in constant, linear, parabolic, and sinusoidal types of Winkler elastic foundation using first-Order nonlocal strain gradient model
- (2019) Subrat Kumar Jena et al. Materials Research Express
- Buckling analyses of three characteristic-lengths featured size-dependent gradient-beam with variational consistent higher order boundary conditions
- (2019) Ya Jun Yu et al. APPLIED MATHEMATICAL MODELLING
- Exact modes for post-buckling characteristics of nonlocal nanobeams in a longitudinal magnetic field
- (2018) H.L. Dai et al. APPLIED MATHEMATICAL MODELLING
- Analytical and numerical modeling of the mixed-mode delamination process for composite moment-loaded double cantilever beams
- (2018) Rossana Dimitri et al. COMPOSITE STRUCTURES
- Generalized exponential, polynomial and trigonometric theories for vibration and stability analysis of porous FG sandwich beams resting on elastic foundations
- (2018) Fiorenzo A. Fazzolari COMPOSITES PART B-ENGINEERING
- Transient response of oscillated carbon nanotubes with an internal and external damping
- (2018) Mohammad Malikan et al. COMPOSITES PART B-ENGINEERING
- Refined shear deformation theories for laminated composite arches and beams with variable thickness: Natural frequency analysis
- (2017) Francesco Tornabene et al. ENGINEERING ANALYSIS WITH BOUNDARY ELEMENTS
- Buckling analysis of tapered nanobeams using nonlocal strain gradient theory and a generalized differential quadrature method
- (2017) H Bakhshi Khaniki et al. Materials Research Express
- Quasi-3D beam models for the computation of eigenfrequencies of functionally graded beams with arbitrary boundary conditions
- (2016) Fiorenzo A. Fazzolari COMPOSITE STRUCTURES
- Buckling of nanobeams under nonuniform temperature based on nonlocal thermoelasticity
- (2016) Y. Jun Yu et al. COMPOSITE STRUCTURES
- Buckling analysis of arbitrary two-directional functionally graded Euler–Bernoulli nano-beams based on nonlocal elasticity theory
- (2016) Mohammad Zamani Nejad et al. INTERNATIONAL JOURNAL OF ENGINEERING SCIENCE
- A general nonlocal nonlinear model for buckling of nanobeams
- (2013) Samir A. Emam APPLIED MATHEMATICAL MODELLING
Discover Peeref hubs
Discuss science. Find collaborators. Network.
Join a conversationBecome a Peeref-certified reviewer
The Peeref Institute provides free reviewer training that teaches the core competencies of the academic peer review process.
Get Started