Torsional static and vibration analysis of functionally graded nanotube with bi-Helmholtz kernel based stress-driven nonlocal integral model
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Publication:824093
DOI10.1007/s10483-021-2708-9zbMath1486.74058OpenAlexW3134999756MaRDI QIDQ824093
Publication date: 14 December 2021
Published in: AMM. Applied Mathematics and Mechanics. (English Edition) (Search for Journal in Brave)
Full work available at URL: https://doi.org/10.1007/s10483-021-2708-9
Classical linear elasticity (74B05) Vibrations in dynamical problems in solid mechanics (74H45) Inhomogeneity in solid mechanics (74E05) Micromechanics of solids (74M25)
Related Items (5)
On geometrically nonlinear mechanics of nanocomposite beams ⋮ Two-phase nonlocal integral models with a bi-Helmholtz averaging kernel for nanorods ⋮ Buckling analysis of functionally graded nanobeams under non-uniform temperature using stress-driven nonlocal elasticity ⋮ On the mechanics of nanobeams on nano-foundations ⋮ Nonlocal gradient integral models with a bi-Helmholtz averaging kernel for functionally graded beams
Cites Work
- A new microstructure-dependent Saint-Venant torsion model based on a modified couple stress theory
- Linear and nonlinear torsional free vibration of functionally graded micro/nano-tubes based on modified couple stress theory
- Torsion of strain gradient bars
- One-dimensional stress-driven nonlocal integral model with bi-Helmholtz kernel: close form solution and consistent size effect
- Experiments and theory in strain gradient elasticity.
- Nonlocal elasticity in nanobeams: the stress-driven integral model
- A numerical analysis of Saint-Venant torsion in strain-gradient bars
- Theoretical analysis on elastic buckling of nanobeams based on stress-driven nonlocal integral model
- Nonlocal and strain gradient effects on nonlinear forced vibration of axially moving nanobeams under internal resonance conditions
- A nonlocal strain gradient shell model incorporating surface effects for vibration analysis of functionally graded cylindrical nanoshells
- Deep postbuckling and nonlinear bending behaviors of nanobeams with nonlocal and strain gradient effects
- Bending of small-scale Timoshenko beams based on the integral/differential nonlocal-micropolar elasticity theory: a finite element approach
- Vibration and wave propagation analysis of twisted micro-beam using strain gradient theory
- Dynamic stability of electrostatic torsional actuators with van der Waals effect
- On a theory of nonlocal elasticity of bi-Helmholtz type and some applications
- Vibration analysis of piezoelectric sandwich nanobeam with flexoelectricity based on nonlocal strain gradient theory
- Analytical solutions of static bending of curved Timoshenko microbeams using Eringen's two‐phase local/nonlocal integral model
- Theoretical analysis for static bending of circular Euler–Bernoulli beam using local and Eringen's nonlocal integral mixed model
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