In-plane bending vibration of L-shaped cantilever nanobeams carrying a tip nanoparticle by nonlocal elasticity
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Publication:6556478
DOI10.1007/S00707-024-03905-2zbMATH Open1541.74036MaRDI QIDQ6556478
Publication date: 17 June 2024
Published in: (Search for Journal in Brave)
resonance frequencyfrequency equationsize effectnonlocal parameterattached-to-structure mass ratiotransverse free vibration
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Cites Work
- A higher-order nonlocal elasticity and strain gradient theory and its applications in wave propagation
- Nonlocal theories for bending, buckling and vibration of beams
- Transverse vibrations of an Euler--Bernoulli uniform beam carrying several particles.
- Simulation of the transverse vibrations of a cantilever beam with an eccentric tip mass in the axial direction using integral transforms
- Dynamic analysis of an L-shaped structure by Rayleigh-Ritz substructure synthesis method
- Free in-plane bending vibration of flexible L-shaped nanostructures based on the nonlocal beam theory
- On nonlocal mechanics of curved elastic beams
- Exact solutions for size-dependent bending of Timoshenko curved beams based on a modified nonlocal strain gradient model
- Simultaneous optimization of a two-link flexible robot arm
- Effect of scale parameter on the deflection of a nonlocal beam and application to energy release rate of a crack
- Virus sensor based on single-walled carbon nanotube: improved theory incorporating surface effects
- Axial wave propagation and vibration of nonlocal nanorods with radial deformation and inertia
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