| 1 | Non-standard interface conditions in flexure of mixture unified gradient Nanobeams | 5.4 | 6 | Citations (PDF) |
| 2 | Nonlinear vibrations of gradient and nonlocal elastic nano-bars | 3.5 | 10 | Citations (PDF) |
| 3 | Nonlinear flexure mechanics of mixture unified gradient nanobeams | 3.5 | 49 | Citations (PDF) |
| 4 | Stationary variational principle of mixture unified gradient elasticity | 5.4 | 57 | Citations (PDF) |
| 5 | On the wave dispersion in functionally graded porous Timoshenko-Ehrenfest nanobeams based on the higher-order nonlocal gradient elasticity | 6.3 | 65 | Citations (PDF) |
| 6 | A mixed variational framework for higher-order unified gradient elasticity | 5.4 | 63 | Citations (PDF) |
| 7 | On the analytical and meshless numerical approaches to mixture stress gradient functionally graded nano-bar in tension | 3.8 | 54 | Citations (PDF) |
| 8 | DYNAMIC CHARACTERISTICS OF MIXTURE UNIFIED GRADIENT ELASTIC NANOBEAMS | 6.6 | 37 | Citations (PDF) |
| 9 | The tale of shear coefficients in Timoshenko–Ehrenfest beam theory: 130 years of progress | 1.8 | 51 | Citations (PDF) |
| 10 | Timoshenko nonlocal strain gradient nanobeams: Variational consistency, exact solutions and carbon nanotube Young moduli | 3.8 | 53 | Citations (PDF) |
| 11 | Unified higher-order theory of two-phase nonlocal gradient elasticity | 1.8 | 5 | Citations (PDF) |
| 12 | Nonlinear flexure mechanics of beams: stress gradient and nonlocal integral theory | 2.1 | 5 | Citations (PDF) |
| 13 | Contribution of nonlocal integral elasticity to modified strain gradient theory | 2.7 | 50 | Citations (PDF) |
| 14 | Flexure mechanics of nonlocal modified gradient nano-beams | 3.2 | 34 | Citations (PDF) |
| 15 | Modified couple stress flexure mechanics of nanobeams | 2.6 | 12 | Citations (PDF) |
| 16 | Analytical and meshless numerical approaches to unified gradient elasticity theory | 3.8 | 48 | Citations (PDF) |
| 17 | On torsion of nonlocal Lam strain gradient FG elastic beams | 6.3 | 37 | Citations (PDF) |
| 18 | Dynamics of nonlocal thick nano-bars | 4.0 | 8 | Citations (PDF) |
| 19 | Nonlinear flexure of Timoshenko–Ehrenfest nano-beams via nonlocal integral elasticity | 2.7 | 14 | Citations (PDF) |
| 20 | Higher–order nonlocal gradient elasticity: A consistent variational theory | 5.4 | 63 | Citations (PDF) |
| 21 | Variationally consistent dynamics of nonlocal gradient elastic beams | 5.4 | 70 | Citations (PDF) |
| 22 | ON NONLOCAL LAM STRAIN GRADIENT MECHANICS OF ELASTIC RODS | 1.3 | 8 | Citations (PDF) |
| 23 | A stress-driven local-nonlocal mixture model for Timoshenko nano-beams | 12.8 | 91 | Citations (PDF) |
| 24 | Aifantis versus Lam strain gradient models of Bishop elastic rods | 2.3 | 47 | Citations (PDF) |
| 25 | Stress-driven nonlocal integral elasticity for axisymmetric nano-plates | 5.4 | 121 | Citations (PDF) |
| 26 | Agglomeration effects of carbon nanotube on residual stresses in polymer nano composite using experimental and analytical method | 2.1 | 8 | Citations (PDF) |
| 27 | Nonlocal strain gradient exact solutions for functionally graded inflected nano-beams | 12.8 | 74 | Citations (PDF) |
| 28 | Longitudinal vibrations of nano-rods by stress-driven integral elasticity | 3.8 | 120 | Citations (PDF) |
| 29 | A consistent variational formulation of Bishop nonlocal rods | 2.0 | 59 | Citations (PDF) |
| 30 | Nonlocal strain gradient torsion of elastic beams: variational formulation and constitutive boundary conditions | 2.1 | 58 | Citations (PDF) |
| 31 | Stress-driven two-phase integral elasticity for torsion of nano-beams | 12.8 | 71 | Citations (PDF) |
| 32 | Reissner stationary variational principle for nonlocal strain gradient theory of elasticity | 3.7 | 51 | Citations (PDF) |
| 33 | Nonlinear vibration analysis of FG nano-beams resting on elastic foundation in thermal environment using stress-driven nonlocal integral model | 4.7 | 79 | Citations (PDF) |
| 34 | On non-linear flexure of beams based on non-local elasticity theory | 5.4 | 40 | Citations (PDF) |
| 35 | Integro-differential nonlocal theory of elasticity | 5.4 | 43 | Citations (PDF) |
| 36 | Free vibrations of elastic beams by modified nonlocal strain gradient theory | 5.4 | 147 | Citations (PDF) |
| 37 | Free vibrations of FG elastic Timoshenko nano-beams by strain gradient and stress-driven nonlocal models | 12.8 | 110 | Citations (PDF) |
| 38 | Analytical Approach for Inverse Reconstruction of Eigenstrains and Residual Stresses in Autofrettaged Spherical Pressure Vessels | 0.9 | 29 | Citations (PDF) |
| 39 | Analytical Inverse Solution of Eigenstrains and Residual Fields in Autofrettaged Thick-Walled Tubes | 0.9 | 33 | Citations (PDF) |
| 40 | Linear and nonlinear flexural analysis of higher-order shear deformation laminated plates with circular delamination | 2.3 | 16 | Citations (PDF) |
| 41 | Effect of Reduced Graphene Oxide Reinforcement on Creep Behavior of Adhesively Bonded Joints | 0.5 | 5 | Citations (PDF) |
| 42 | Unified formulation of the stress field of saint-Venant's flexure problem for symmetric cross-sections | 8.9 | 41 | Citations (PDF) |
| 43 | Improving the mechanical behavior of the adhesively bonded joints using RGO additive | 3.4 | 62 | Citations (PDF) |
| 44 | A regularized approach to linear regression of fatigue life measurements | 3.5 | 7 | Citations (PDF) |
| 45 | A Note on the Inverse Reconstruction of Residual Fields in Surface Peened Plates | 1.0 | 3 | Citations (PDF) |
| 46 | Inverse determination of the regularized residual stress and eigenstrain fields due to surface peening | 1.3 | 44 | Citations (PDF) |
| 47 | A smoothed inverse eigenstrain method for reconstruction of the regularized residual fields | 2.9 | 58 | Citations (PDF) |
| 48 | New framework for Bayesian statistical analysis and interpolation of residual stress measurements | 2.0 | 9 | Citations (PDF) |
| 49 | Higher order mixture nonlocal gradient theory of wave propagation | 1.9 | 43 | Citations (PDF) |
| 50 | Two‐phase local/nonlocal gradient mechanics of elastic torsion | 1.9 | 38 | Citations (PDF) |
