Semi-analytic solution of Eringen’s two-phase local/nonlocal model for Euler-Bernoulli beam with axial force

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

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

Nonlocal integral elasticity in nanostructures, mixtures, boundary effects and limit behaviours

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Stress-driven modeling of nonlocal thermoelastic behavior of nanobeams

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Stress-driven integral elastic theory for torsion of nano-beams

(2018) Raffaele Barretta et al.   MECHANICS RESEARCH COMMUNICATIONS

Respond to the comment letter by Romano and Barretta on the paper “Exact solution of Eringen's nonlocal integral model for bending of Euler–Bernoulli and Timoshenko beams”

(2017) Meral Tuna 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

Recent Researches on Nonlocal Elasticity Theory in the Vibration of Carbon Nanotubes Using Beam Models: A Review

(2016) L. Behera et al.   ARCHIVES OF COMPUTATIONAL METHODS IN ENGINEERING

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 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

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

Comments on nonlocal effects in nano-cantilever beams

(2015) Cheng Li et al.   INTERNATIONAL JOURNAL OF ENGINEERING SCIENCE

A unified integro-differential nonlocal model

(2015) Parisa Khodabakhshi et al.   INTERNATIONAL JOURNAL OF ENGINEERING SCIENCE

On the truth of nanoscale for nanobeams based on nonlocal elastic stress field theory: equilibrium, governing equation and static deflection

(2010) C. W. Lim   APPLIED MATHEMATICS AND MECHANICS-ENGLISH EDITION

A molecular mechanics approach for the vibration of single-walled carbon nanotubes

(2010) R. Chowdhury et al.   COMPUTATIONAL MATERIALS SCIENCE

Wave propagation in carbon nanotubes: nonlocal elasticity-induced stiffness and velocity enhancement effects

(2010) C. W. Lim et al.   Journal of Mechanics of Materials and Structures

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

(2008) N Challamel et al.   NANOTECHNOLOGY