Pages that link to "Item:Q2313904"

The following pages link to Bending of small-scale Timoshenko beams based on the integral/differential nonlocal-micropolar elasticity theory: a finite element approach (Q2313904):

Displaying 13 items.

• Structural analysis using a dipolar elastic Timoshenko beam (Q335213) (← links)
• Bending analysis of microtubules using nonlocal Euler-Bernoulli beam theory (Q552457) (← links)
• A size-dependent nonlinear microbeam model based on the micropolar elasticity theory (Q683578) (← links)
• Size-dependent thermoelasticity of a finite bi-layered nanoscale plate based on nonlocal dual-phase-lag heat conduction and Eringen's nonlocal elasticity (Q824054) (← links)
• Torsional static and vibration analysis of functionally graded nanotube with bi-Helmholtz kernel based stress-driven nonlocal integral model (Q824093) (← links)
• Vibration analysis of two-dimensional structures using micropolar elements (Q825401) (← links)
• Finite element nonlocal integral elasticity approach (Q1982950) (← links)
• Micromorphic continuum theory: finite element analysis of 3D elasticity with applications in beam- and plate-type structures (Q1982954) (← links)
• Nonlocal integral elasticity for third-order small-scale beams (Q2156218) (← links)
• Nonlinear bending analysis of hyperelastic Mindlin plates: a numerical approach (Q2663261) (← links)
• A novel approach to nonlinear variable-order fractional viscoelasticity (Q4994617) (← links)
• An analytical study on wave propagation in functionally graded nano-beams/tubes based on the integral formulation of nonlocal elasticity (Q5104325) (← links)
• Two phase local/nonlocal thermo elastic waves in a graphene oxide composite nanobeam subjected to electrical potential (Q6121208) (← links)