Low-Dimensional Chaos in a Flexible Tube Conveying FluidSource: Journal of Applied Mechanics:;1992:;volume( 059 ):;issue: 001::page 196DOI: 10.1115/1.2899428Publisher: The American Society of Mechanical Engineers (ASME)
Abstract: This paper describes the observed dynamical behavior of a cantilevered pipe conveying fluid, an autonomous nonconservative (circulatory) dynamical system, limit-cycle motions of which, upon loss of stability via a Hopf bifurcation, interact with nonlinear motion-limiting constraints. This system was found to become chaotic at sufficiently high flow rates. Motions of the system, sensed by an optical tracking system, were analyzed by Fast Fourier Transform, autocorrelation, Poincaré map, and delay embedding techniques, and the fractal dimension of the system, d c , was calculated. Values of d c = 1.03, 1.53, and 3.20 were obtained in the period-1, “fuzzy” period-2 and chaotic regimes of oscillation of the system. Based on these calculations, a four-dimensional analytical model was constructed, which was found to capture the essential dynamical features of observed behavior quite well.
keyword(s): Fluids , Chaos , Motion , Dimensions , Dynamic systems , Pipes , Bifurcation , Cycles , Delays , Fast Fourier transforms , Fractals , Poincare mapping , Oscillations , Stability AND Flow (Dynamics) ,
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| contributor author | M. P. Païdoussis | |
| contributor author | J. P. Cusumano | |
| contributor author | G. S. Copeland | |
| date accessioned | 2017-05-08T23:37:38Z | |
| date available | 2017-05-08T23:37:38Z | |
| date copyright | March, 1992 | |
| date issued | 1992 | |
| identifier issn | 0021-8936 | |
| identifier other | JAMCAV-26337#196_1.pdf | |
| identifier uri | http://yetl.yabesh.ir/yetl/handle/yetl/109789 | |
| description abstract | This paper describes the observed dynamical behavior of a cantilevered pipe conveying fluid, an autonomous nonconservative (circulatory) dynamical system, limit-cycle motions of which, upon loss of stability via a Hopf bifurcation, interact with nonlinear motion-limiting constraints. This system was found to become chaotic at sufficiently high flow rates. Motions of the system, sensed by an optical tracking system, were analyzed by Fast Fourier Transform, autocorrelation, Poincaré map, and delay embedding techniques, and the fractal dimension of the system, d c , was calculated. Values of d c = 1.03, 1.53, and 3.20 were obtained in the period-1, “fuzzy” period-2 and chaotic regimes of oscillation of the system. Based on these calculations, a four-dimensional analytical model was constructed, which was found to capture the essential dynamical features of observed behavior quite well. | |
| publisher | The American Society of Mechanical Engineers (ASME) | |
| title | Low-Dimensional Chaos in a Flexible Tube Conveying Fluid | |
| type | Journal Paper | |
| journal volume | 59 | |
| journal issue | 1 | |
| journal title | Journal of Applied Mechanics | |
| identifier doi | 10.1115/1.2899428 | |
| journal fristpage | 196 | |
| journal lastpage | 205 | |
| identifier eissn | 1528-9036 | |
| keywords | Fluids | |
| keywords | Chaos | |
| keywords | Motion | |
| keywords | Dimensions | |
| keywords | Dynamic systems | |
| keywords | Pipes | |
| keywords | Bifurcation | |
| keywords | Cycles | |
| keywords | Delays | |
| keywords | Fast Fourier transforms | |
| keywords | Fractals | |
| keywords | Poincare mapping | |
| keywords | Oscillations | |
| keywords | Stability AND Flow (Dynamics) | |
| tree | Journal of Applied Mechanics:;1992:;volume( 059 ):;issue: 001 | |
| contenttype | Fulltext |