Exact solutions for bending of Timoshenko curved nanobeams made of functionally graded materials based on stress-driven nonlocal integral model
Size-dependent static bending analysis of functionally graded (FG) curved nanobeams
based on the Timoshenko beam theory is performed with the application of a stress-driven …
based on the Timoshenko beam theory is performed with the application of a stress-driven …
Size-dependent nonlinear post-buckling analysis of functionally graded porous Timoshenko microbeam with nonlocal integral models
Y Tang, H Qing - Communications in Nonlinear Science and Numerical …, 2023 - Elsevier
Strain-driven (ɛ D) and stress-driven (σ D) two-phase local/nonlocal integral models
(TPNIM) are applied to study the size-dependent nonlinear post-buckling behaviors of …
(TPNIM) are applied to study the size-dependent nonlinear post-buckling behaviors of …
On nonlocal mechanics of curved elastic beams
R Barretta, FM de Sciarra, MS Vaccaro - International Journal of …, 2019 - Elsevier
Curved beams are basic structural components of Nano-Electro-Mechanical-Systems
(NEMS) whose design requires appropriate modelling of scale effects. In the present paper …
(NEMS) whose design requires appropriate modelling of scale effects. In the present paper …
Linear and nonlinear free vibration analysis of functionally graded porous nanobeam using stress-driven nonlocal integral model
H Qing, L Wei - Communications in Nonlinear Science and Numerical …, 2022 - Elsevier
Linear and nonlinear free vibration analysis of functionally graded porous (FGP) nanobeam
with four different porous distribution patterns is performed on the basis of stress-driven two …
with four different porous distribution patterns is performed on the basis of stress-driven two …
Integral and differential approaches to Eringen's nonlocal elasticity models accounting for boundary effects with applications to beams in bending
AA Pisano, P Fuschi, C Polizzotto - ZAMM‐Journal of Applied …, 2021 - Wiley Online Library
The Eringen's fully nonlocal elasticity model is known to lead to ill‐posed boundary‐value
problems and to suffer some boundary effects arising from particle interactions impeded by …
problems and to suffer some boundary effects arising from particle interactions impeded by …
Buckling analysis of curved sandwich microbeams made of functionally graded materials via the stress-driven nonlocal integral model
Size-dependent buckling analysis for slightly curved sandwich microbeams made of
functionally graded (FG) materials is performed via a stress-driven nonlocal model. The …
functionally graded (FG) materials is performed via a stress-driven nonlocal model. The …
Bending and buckling analysis of functionally graded Timoshenko nanobeam using Two-Phase Local/Nonlocal piezoelectric integral model
YM Ren, H Qing - Composite Structures, 2022 - Elsevier
Previous studies indicate that nonlocal piezoelectric differential model would lead to an
inconsistent bending response of Euler-Bernoulli nanobeam. In this paper, static bending …
inconsistent bending response of Euler-Bernoulli nanobeam. In this paper, static bending …
Bi-Helmholtz kernel based stress-driven nonlocal integral model with discontinuity for size-dependent fracture analysis of edge-cracked nanobeam
Y Tang, H Qing - Mechanics of Advanced Materials and Structures, 2024 - Taylor & Francis
Mathematical formulation is proposed to deal with average bi-Helmholtz kernel (BHK) based
stress-driven nonlocal integral model (SDNIM) with discontinuity, which is converted into …
stress-driven nonlocal integral model (SDNIM) with discontinuity, which is converted into …
A new finite element method framework for axially functionally-graded nanobeam with stress-driven two-phase nonlocal integral model
Nano-structures always show size effects. In the paper, a new FEM framework is developed
to analyze the mechanical responses of nanobeams made of axially functionally-graded …
to analyze the mechanical responses of nanobeams made of axially functionally-graded …
One-dimensional stress-driven nonlocal integral model with bi-Helmholtz kernel: close form solution and consistent size effect
In this paper, stress-driven nonlocal integral model with bi-Helmholtz kernel is applied to
investigate the elastostatic tensile and free vibration analysis of microbar. The relation …
investigate the elastostatic tensile and free vibration analysis of microbar. The relation …