Pages that link to "Item:Q1625954"

The following pages link to Bending of Euler-Bernoulli beams using Eringen's integral formulation: a paradox resolved (Q1625954):

Displaying 38 items.

• A size-dependent quasi-3D model for bending and buckling of porous functionally graded curved nanobeam (Q6063680) (← links)
• An analytical model for predicting equivalent elastic moduli of micro/nano-honeycombs with nonlocal effects (Q6072700) (← links)
• A micromorphic approach to stress gradient elasticity theory with an assessment of the boundary conditions and size effects (Q6086251) (← links)
• Doublet mechanical analysis of bending of Euler‐Bernoulli and Timoshenko nanobeams (Q6086261) (← links)
• Nonlocal gradient mechanics of nanobeams for non-smooth fields (Q6102484) (← links)
• Euler-Bernoulli elastic beam models of Eringen's differential nonlocal type revisited within a \(C^0\)-continuous displacement framework (Q6111165) (← links)
• On the nonlocal bending problem with fractional hereditariness (Q6113577) (← links)
• Exact and approximate analytical solutions for nonlocal nanoplates of arbitrary shapes in bending using the line element-less method (Q6113590) (← links)
• Analytical solutions of static bending of curved Timoshenko microbeams using Eringen's two‐phase local/nonlocal integral model (Q6121486) (← links)
• Definiteness of certain differential operators obtained via moment expansion of non‐negative functions (Q6130822) (← links)
• Nonlinear wave propagation analysis in Timoshenko nano-beams considering nonlocal and strain gradient effects (Q6143164) (← links)
• Theoretical analysis for static bending of circular Euler–Bernoulli beam using local and Eringen's nonlocal integral mixed model (Q6145914) (← links)
• Integral and differential approaches to Eringen's nonlocal elasticity models accounting for boundary effects with applications to beams in bending (Q6149661) (← links)
• On the importance of proper kernel normalization procedure in nonlocal integral continuum modeling of nanobeams (Q6149706) (← links)
• On wave propagation in nanobeams (Q6155118) (← links)
• Bending analysis of functionally graded nanobeams based on stress-driven nonlocal model incorporating surface energy effects (Q6160043) (← links)
• Approximate closed-form solutions for vibration of nano-beams of local/non-local mixture (Q6162976) (← links)
• A generalized integro-differential theory of nonlocal elasticity of \(n\)-Helmholtz type. I: Analytical formulation and thermodynamic framework (Q6172556) (← links)
• On formulation of nonlocal elasticity problems (Q6173245) (← links)
• Random vibrations of stress-driven nonlocal beams with external damping (Q6173246) (← links)
• Nonclassical linear theories of continuum mechanics (Q6175382) (← links)
• Exact and asymptotic bending analysis of microbeams under different boundary conditions using stress‐derived nonlocal integral model (Q6182516) (← links)
• An efficient numerical method for the quasi-static behaviour of micropolar viscoelastic Timoshenko beams for couple stress problems (Q6189249) (← links)
• Finite element formulation for nano‐scaled beam elements (Q6192245) (← links)
• Theoretical analysis of free vibration of microbeams under different boundary conditions using stress-driven nonlocal integral model (Q6490623) (← links)
• Vibrational analysis of two crossed graphene nanoribbons via nonlocal differential/integral models (Q6490797) (← links)
• Large amplitude free vibration analysis of isotropic curved nano/microbeams using a nonlocal sinusoidal shear deformation theory-based finite element method (Q6491403) (← links)
• Modelling issues and advances in nonlocal beams mechanics (Q6494240) (← links)
• Elastostatics of nonuniform miniaturized beams: explicit solutions through a nonlocal transfer matrix formulation (Q6494244) (← links)
• Elastic buckling and free vibration of functionally graded piezoelectric nanobeams using nonlocal integral models (Q6499446) (← links)
• Spatially nonlocal instability modeling of torsionaly loaded nanobeams (Q6539796) (← links)
• Higher-order multi-scale computational approach and its convergence for nonlocal gradient elasticity problems of composite materials (Q6543624) (← links)
• Free high-frequency vibrations of nonlocally elastic beam with varying cross-section area (Q6547458) (← links)
• Approximate solutions to axial vibrations of nanobars in nonlinear elastic medium (Q6603840) (← links)
• Bifurcation analysis of a nanotube through which passes a nanostring (Q6639923) (← links)
• A modified neural network method for computing the Lyapunov exponent spectrum in the nonlinear analysis of dynamical systems (Q6649288) (← links)
• Buckling analysis of functionally graded nanobeams via surface stress-driven model (Q6663467) (← links)
• Large deflection of a nonlocal gradient cantilever beam (Q6663509) (← links)