Demšić et al., 2019 - Google Patents
Resonance regions due to interaction of forced and parametric vibration of a parabolic cableDemšić et al., 2019
- Document ID
- 14349035013009564659
- Author
- Demšić M
- Uroš M
- Lazarević A
- Lazarević D
- Publication year
- Publication venue
- Journal of sound and vibration
External Links
Snippet
Taut cables such as those used in cable-stayed bridges are prone to exert a large amplitude response due to support motion. Support motion generally involve longitudinal and transverse components with respect to the cord. Such motions induce parametric and …
- 230000003993 interaction 0 title abstract description 49
Similar Documents
| Publication | Publication Date | Title |
|---|---|---|
| Demšić et al. | Resonance regions due to interaction of forced and parametric vibration of a parabolic cable | |
| Liu et al. | Nonlinear dynamic responses of beamlike truss based on the equivalent nonlinear beam model | |
| Shaw et al. | Periodic responses of a structure with 3: 1 internal resonance | |
| Thai et al. | Isogeometric analysis of size-dependent isotropic and sandwich functionally graded microplates based on modified strain gradient elasticity theory | |
| Krenk et al. | Vibrations of a shallow cable with a viscous damper | |
| Riedel et al. | Coupled, forced response of an axially moving strip with internal resonance | |
| Wang et al. | Nonlinear vibration of axially accelerating hyperelastic beams | |
| Bayat et al. | Analytical study on the vibration frequencies of tapered beams | |
| Macdonald | Multi-modal vibration amplitudes of taut inclined cables due to direct and/or parametric excitation | |
| Baghani et al. | Analysis of large amplitude free vibrations of clamped tapered beams on a nonlinear elastic foundation | |
| Clementi et al. | Nonlinear vibrations of non-uniform beams by the MTS asymptotic expansion method | |
| Wei et al. | Nonlinear responses of a cable-beam coupled system under parametric and external excitations | |
| Ducceschi et al. | Conservative finite difference time domain schemes for the prestressed Timoshenko, shear and Euler–Bernoulli beam equations | |
| JP6048358B2 (en) | Analysis device | |
| El-Dib | Nonlinear Mathieu equation and coupled resonance mechanism | |
| Zhao et al. | Analytical solutions for resonant response of suspended cables subjected to external excitation | |
| Tang et al. | Nonlinear vibrations of axially moving Timoshenko beams under weak and strong external excitations | |
| Wang | Asymptotic analysis on weakly forced vibration of axially moving viscoelastic beam constituted by standard linear solid model | |
| Mousa et al. | Nonlinear stability analysis of a composite laminated piezoelectric rectangular plate with multi-parametric and external excitations | |
| Tsiatas | A new efficient method to evaluate exact stiffness and mass matrices of non-uniform beams resting on an elastic foundation | |
| Zhang et al. | Stability and vibration analysis of axially-loaded shear beam-columns carrying elastically restrained mass | |
| Feng et al. | Principal parametric resonances of a slender cantilever beam subject to axial narrow-band random excitation of its base | |
| Fereidoon et al. | Nonlinear Vibration of Oscillation Systems using Frequency‐Amplitude Formulation | |
| Diba et al. | Nonlinear vibration analysis of isotropic plate with inclined part-through surface crack | |
| Guo et al. | Transverse vibrations of arbitrary non-uniform beams |