Free vibration analysis of Euler–Bernoulli curved beams using two-phase nonlocal integral models

Hygro-thermal bending behavior of porous FG nano-beams via local/nonlocal strain and stress gradient theories of elasticity

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Theoretical Analysis of Free Vibration of Microbeams under Different Boundary Conditions Using Stress-Driven Nonlocal Integral Model

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Nonlocal transient dynamic analysis of laminated composite plates

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Size-dependent buckling analysis of Euler–Bernoulli nanobeam under non-uniform concentration

(2020) Chenlin Li et al.   ARCHIVE OF APPLIED MECHANICS

One-dimensional stress-driven nonlocal integral model with bi-Helmholtz kernel: close form solution and consistent size effect

(2020) Pei-Liang Bian et al.   APPLIED MATHEMATICAL MODELLING

Exact solutions for bending of Timoshenko curved nanobeams made of functionally graded materials based on stress-driven nonlocal integral model

(2020) Pei Zhang et al.   COMPOSITE STRUCTURES

Free flexural vibrations of nanobeams with non-classical boundary conditions using stress-driven nonlocal model

(2020) Raimondo Luciano et al.   MECHANICS RESEARCH COMMUNICATIONS

A stress-driven local-nonlocal mixture model for Timoshenko nano-beams

(2019) Raffaele Barretta et al.   COMPOSITES PART B-ENGINEERING

Theoretical analysis for static bending of circular Euler–Bernoulli beam using local and Eringen's nonlocal integral mixed model

(2019) Pei Zhang et al.   ZAMM-Zeitschrift fur Angewandte Mathematik und Mechanik

Nonlocal integral thermoelasticity: A thermodynamic framework for functionally graded beams

(2019) Raffaele Barretta et al.   COMPOSITE STRUCTURES

On nonlocal mechanics of curved elastic beams

(2019) Raffaele Barretta et al.   INTERNATIONAL JOURNAL OF ENGINEERING SCIENCE

Theoretical analysis on elastic buckling of nanobeams based on stress-driven nonlocal integral model

(2019) Peng Jiang et al.   APPLIED MATHEMATICS AND MECHANICS-ENGLISH EDITION

Novel differential quadrature element method for vibration analysis of hybrid nonlocal Euler–Bernoulli beams

(2018) Xinwei Wang   APPLIED MATHEMATICS LETTERS

Stress-driven two-phase integral elasticity for torsion of nano-beams

(2018) R. Barretta et al.   COMPOSITES PART B-ENGINEERING

Stress-driven nonlocal integral model for Timoshenko elastic nano-beams

(2018) Raffaele Barretta et al.   EUROPEAN JOURNAL OF MECHANICS A-SOLIDS

Nonlocal nonlinear analysis of functionally graded plates using third-order shear deformation theory

(2018) S. Srividhya et al.   INTERNATIONAL JOURNAL OF ENGINEERING SCIENCE

Viscoelastic free vibration behavior of nano-scaled beams via finite element nonlocal integral elasticity approach

(2018) Maysam Naghinejad et al.   JOURNAL OF VIBRATION AND CONTROL

Exact solutions for the bending of Timoshenko beams using Eringen’s two-phase nonlocal model

(2018) Yuanbin Wang et al.   MATHEMATICS AND MECHANICS OF SOLIDS

Photoacoustic microbeam-oscillator with tunable resonance direction and amplitude

(2018) Qingjun Wu et al.   OPTICS COMMUNICATIONS

Vibration analysis of rotating nanobeam systems using Eringen's two-phase local/nonlocal model

(2018) Hossein Bakhshi Khaniki   PHYSICA E-LOW-DIMENSIONAL SYSTEMS & NANOSTRUCTURES

Closed-form solutions in stress-driven two-phase integral elasticity for bending of functionally graded nano-beams

(2018) Raffaele Barretta et al.   PHYSICA E-LOW-DIMENSIONAL SYSTEMS & NANOSTRUCTURES

Buckling and free vibration analysis of functionally graded sandwich micro-beams resting on elastic foundation by using nonlocal strain gradient theory in conjunction with higher order shear theories under thermal effect

(2018) Mohammed Al-shujairi et al.   COMPOSITES PART B-ENGINEERING

Quadrature element method for vibration analysis of functionally graded beams

(2017) Chunhua Jin et al.   ENGINEERING COMPUTATIONS

Vibrations of Bernoulli-Euler beams using the two-phase nonlocal elasticity theory

(2017) J. Fernández-Sáez et al.   INTERNATIONAL JOURNAL OF ENGINEERING SCIENCE

Nonlocal elasticity in nanobeams: the stress-driven integral model

(2017) Giovanni Romano et al.   INTERNATIONAL JOURNAL OF ENGINEERING SCIENCE

Constitutive boundary conditions and paradoxes in nonlocal elastic nanobeams

(2017) Giovanni Romano et al.   INTERNATIONAL JOURNAL OF MECHANICAL SCIENCES

On nonlocal integral models for elastic nano-beams

(2017) Giovanni Romano et al.   INTERNATIONAL JOURNAL OF MECHANICAL SCIENCES

Free vibration characteristics of nanoscaled beams based on nonlocal integral elasticity theory

(2017) Maysam Naghinejad et al.   JOURNAL OF VIBRATION AND CONTROL

A nonlocal higher-order curved beam finite model including thickness stretching effect for bending analysis of curved nanobeams

(2017) T. Merzouki et al.   MECHANICS OF ADVANCED MATERIALS AND STRUCTURES

Nonlocal nonlinear bending and free vibration analysis of a rotating laminated nano cantilever beam

(2017) K. Preethi et al.   MECHANICS OF ADVANCED MATERIALS AND STRUCTURES

Comment on the paper “Exact solution of Eringen’s nonlocal integral model for bending of Euler–Bernoulli and Timoshenko beams” by Meral Tuna & Mesut Kirca

(2016) Giovanni Romano et al.   INTERNATIONAL JOURNAL OF ENGINEERING SCIENCE

Exact solution of Eringen's nonlocal integral model for vibration and buckling of Euler–Bernoulli beam

(2016) Meral Tuna et al.   INTERNATIONAL JOURNAL OF ENGINEERING SCIENCE

Exact solution of Eringen's nonlocal integral model for bending of Euler–Bernoulli and Timoshenko beams

(2016) Meral Tuna et al.   INTERNATIONAL JOURNAL OF ENGINEERING SCIENCE

Bending of Euler–Bernoulli beams using Eringen’s integral formulation: A paradox resolved

(2016) J. Fernández-Sáez et al.   INTERNATIONAL JOURNAL OF ENGINEERING SCIENCE

Vibration analysis of smart piezoelectrically actuated nanobeams subjected to magneto-electrical field in thermal environment

(2016) Farzad Ebrahimi et al.   JOURNAL OF VIBRATION AND CONTROL

Vibration analysis of a nano-turbine blade based on Eringen nonlocal elasticity applying the differential quadrature method

(2016) Majid Ghadiri et al.   JOURNAL OF VIBRATION AND CONTROL

Axisymmetric free vibration of closed thin spherical nanoshells with bending effects

(2016) Javier Vila et al.   JOURNAL OF VIBRATION AND CONTROL

Exact solutions for the static bending of Euler-Bernoulli beams using Eringen’s two-phase local/nonlocal model

(2016) Y. B. Wang et al.   AIP Advances

Strong Formulation Finite Element Method Based on Differential Quadrature: A Survey

(2015) Francesco Tornabene et al.   Applied Mechanics Reviews

Comments on nonlocal effects in nano-cantilever beams

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A unified integro-differential nonlocal model

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On nonconservativeness of Eringen’s nonlocal elasticity in beam mechanics: correction from a discrete-based approach

(2014) Noël Challamel et al.   ARCHIVE OF APPLIED MECHANICS

Nonlocal elasticity defined by Eringen’s integral model: Introduction of a boundary layer method

(2014) R. Abdollahi et al.   INTERNATIONAL JOURNAL OF SOLIDS AND STRUCTURES

Vibration analysis of Euler–Bernoulli nanobeams by using finite element method

(2012) M.A. Eltaher et al.   APPLIED MATHEMATICAL MODELLING

Bending, buckling and vibration problems of nonlocal Euler beams using Ritz method

(2012) S.A.M. Ghannadpour et al.   COMPOSITE STRUCTURES

Static pull-in analysis of electrostatically actuated microbeams using homotopy perturbation method

(2009) M. Mojahedi et al.   APPLIED MATHEMATICAL MODELLING

Nonlocal integral elasticity: 2D finite element based solutions

(2009) A.A. Pisano et al.   INTERNATIONAL JOURNAL OF SOLIDS AND STRUCTURES

The small length scale effect for a non-local cantilever beam: a paradox solved

(2008) N Challamel et al.   NANOTECHNOLOGY

A more comprehensive modeling of atomic force microscope cantilever

(2008) M.H. Mahdavi et al.   ULTRAMICROSCOPY