Nonlocal beam analysis based on the stress-driven two-phase theory

被引:0
|
作者
Pinnola, F. P. [1 ]
Vaccaro, M. S. [1 ]
Barretta, R. [1 ]
de Sciarra, F. Marotti [1 ]
机构
[1] Dept Struct Engn & Architecture, Naples, Italy
来源
CURRENT PERSPECTIVES AND NEW DIRECTIONS IN MECHANICS, MODELLING AND DESIGN OF STRUCTURAL SYSTEMS | 2022年
关键词
Biaxial bending of nano-beams; Integral elasticity; Nonlocal stress-driven model;
D O I
10.1201/9781003348450-51
中图分类号
TU [建筑科学];
学科分类号
0813 ;
摘要
The size-dependent behaviour of elastic beams is investigated using Bernoulli-Euler kinematics. The two-phase stress-driven integral elasticity is adopted to model size effects. Biaxial bending is considered and an effective coordinate-free solution procedure is proposed. The corresponding governing equations of non-local elasticity are established and discussed. The contributed theoretical results could be useful for the implementation of procedure oriented to design and optimization of modern sensors and actuators.
引用
收藏
页码:109 / 110
页数:2
相关论文
共 50 条
  • [21] Stability analysis of multilayer graphene nano-sensors: a new stress-driven nonlocal shear beam model
    Yaghoobi, Majid
    Koochi, Ali
    MICROSYSTEM TECHNOLOGIES-MICRO-AND NANOSYSTEMS-INFORMATION STORAGE AND PROCESSING SYSTEMS, 2024, 30 (08): : 961 - 969
  • [22] Free vibration analysis of functionally graded nanobeams based on surface stress-driven nonlocal model
    Feo, Luciano
    Lovisi, Giuseppe
    Penna, Rosa
    MECHANICS OF ADVANCED MATERIALS AND STRUCTURES, 2024, 31 (28) : 10391 - 10399
  • [23] Pull-in Instability Analysis of a Nanocantilever Based on the Two-Phase Nonlocal Theory of Elasticity br
    Mikhasev, Gennadi
    Radi, Enrico
    Misnik, Vyacheslav
    JOURNAL OF APPLIED AND COMPUTATIONAL MECHANICS, 2022, 8 (04): : 1456 - 1466
  • [24] Nonlocal elasticity in nanobeams: the stress-driven integral model
    Romano, Giovanni
    Barretta, Raffaele
    INTERNATIONAL JOURNAL OF ENGINEERING SCIENCE, 2017, 115 : 14 - 27
  • [25] Axial and Torsional Free Vibrations of Elastic Nano-Beams by Stress-Driven Two-Phase Elasticity
    Apuzzo, A.
    Barretta, R.
    Fabbrocino, F.
    Faghidian, S. Ali
    Luciano, R.
    de Sciarra, F. Marotti
    JOURNAL OF APPLIED AND COMPUTATIONAL MECHANICS, 2019, 5 (02): : 402 - 413
  • [26] Stress-driven modeling of nonlocal thermoelastic behavior of nanobeams
    Barretta, Raffaele
    Canadija, Marko
    Luciano, Raimondo
    de Sciarra, Francesco Marotti
    INTERNATIONAL JOURNAL OF ENGINEERING SCIENCE, 2018, 126 : 53 - 67
  • [27] Stress-driven nonlocal homogenization method for cellular structures
    Li, Shuo
    Xu, Enyong
    Zhan, Xin
    Zheng, Weiguang
    Li, Li
    AEROSPACE SCIENCE AND TECHNOLOGY, 2024, 155
  • [28] Finite element method for stress-driven nonlocal beams
    Pinnola, Francesco Paolo
    Vaccaro, Marzia Sara
    Barretta, Raffaele
    de Sciarra, Francesco Marotti
    ENGINEERING ANALYSIS WITH BOUNDARY ELEMENTS, 2021, 134 : 22 - 34
  • [29] Flexibility-based stress-driven nonlocal frame element: formulation and applications
    Limkatanyu, Suchart
    Sae-Long, Worathep
    Sedighi, Hamid M.
    Rungamornrat, Jaroon
    Sukontasukkul, Piti
    Zhang, Hexin
    Chindaprasirt, Prinya
    ENGINEERING WITH COMPUTERS, 2023, 39 (01) : 399 - 417
  • [30] Equivalence between micromorphic, nonlocal gradient, and two-phase nonlocal beam theories
    Challamel, Noel
    Wang, C. M.
    Reddy, J. N.
    Faghidian, S. A.
    ACTA MECHANICA, 2025, 236 (02) : 871 - 902
12345