Analytical Method of Response of Piping System With Nonlinear Support

[+] Author and Article Information
Shigeru Aoki

Department of Mechanical Engineering, Tokyo Metropolitan College of Technology, 1-10-40, Higashi-Ohi, Shinagawa-ku, Tokyo, 140-0011, Japan

Takeshi Watanabe

Faculty of Education and Human Sciences, Yamanashi University, 4-4-37 Takeda, Kofu-City 400-8510, Japan

J. Pressure Vessel Technol 122(4), 437-442 (Jun 28, 2000) (6 pages) doi:10.1115/1.1308293 History: Received May 04, 1999; Revised June 28, 2000
Copyright © 2000 by ASME
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Grahic Jump Location
Resonance curve of nonlinear continuous system (K1/k=40,K2/k=20,K3/k=100); (a) y00=1.0, (b) y00=0.5
Grahic Jump Location
Mode shapes of nonlinear continuous system (y00=1.0); (a) K1/k=4,K2/k=2,K3/k=10, (b) K1/k=40,K2/k=20,K3/k=100
Grahic Jump Location
Analytical model of nonlinear continuous system
Grahic Jump Location
Hysteresis loop characteristics of restoring force of supports
Grahic Jump Location
Waveform of nonlinear restoring force g(θ)
Grahic Jump Location
Resonance curve of nonlinear continuous system (K1/k=4,K2/k=2,K3/k=10); (a) y00=1.0, (b) y00=0.5



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