Equilibria of axially moving beams in the supercritical regime
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Publication:363365
DOI10.1007/s00419-009-0394-yzbMath1271.74223OpenAlexW2138627840MaRDI QIDQ363365
Publication date: 2 September 2013
Published in: Archive of Applied Mechanics (Search for Journal in Brave)
Full work available at URL: https://doi.org/10.1007/s00419-009-0394-y
finite difference methodnonlinearitydifferential quadrature methodaxially moving beamtransverse vibrationsupercritical
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Related Items (7)
Natural frequencies of a super-critical transporting Timoshenko beam ⋮ Supercritical forced response of coupled motion of a nonlinear transporting beam ⋮ Supercritical equilibrium solutions of axially moving beams with hybrid boundary conditions ⋮ Asymptotic solutions of coupled equations of supercritically axially moving beam ⋮ Stability in parametric resonance of an axially moving beam constituted by fractional order material ⋮ Equilibrium bifurcation of high-speed axially moving Timoshenko beams ⋮ Natural frequencies of nonlinear vibration of axially moving beams
Cites Work
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- Steady-state response of axially moving viscoelastic beams with pulsating speed: comparison of two nonlinear models
- Stability of axially accelerating viscoelastic beams: Multi-scale analysis with numerical confirmations
- Nonlinear free transverse vibration of an axially moving beam: Comparison of two models
- Coupled Belt-Pulley Vibration in Serpentine Drives With Belt Bending Stiffness
- Supercritical stability of an axially moving beam part I: Model and equilibrium analysis
- A New Approach In Applying Differential Quadrature To Static And Free Vibrational Analyses Of Beams And Plates
- Linear and Nonlinear Structural Mechanics
- Free, Periodic, Nonlinear Oscillation of an Axially Moving Strip
- Dual reciprocity BEM applied to transient elastodynamic problem with differential quadrature method in time.
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