TY - JOUR
T1 - Nonlinear responses of a rub-impact overhung rotor
AU - Qin, Weiyang
AU - Chen, Guanrong
AU - Meng, Guang
PY - 2004/3
Y1 - 2004/3
N2 - For a rotor system with bearings and step-diameter shaft in the oxygen pump of an engine, the contact between the rotor and the case is considered, and the chaotic response and bifurcation are investigated. The system is divided into elements of elastic support, shaft and disk, and based on the transfer matrix method, the motion equation of the system is derived, and solved by Newmark integration method. It is found that hardening the support can delay the occurrence of chaos. When rubbing begins, the grazing bifurcation will cause periodic motion to become quasi-period. With variation of system parameters, such as rotating speed, imbalance and external damping, chaotic response can be observed, along with other complex dynamics such as period- doubling bifurcation and torus bifurcation in the response.
AB - For a rotor system with bearings and step-diameter shaft in the oxygen pump of an engine, the contact between the rotor and the case is considered, and the chaotic response and bifurcation are investigated. The system is divided into elements of elastic support, shaft and disk, and based on the transfer matrix method, the motion equation of the system is derived, and solved by Newmark integration method. It is found that hardening the support can delay the occurrence of chaos. When rubbing begins, the grazing bifurcation will cause periodic motion to become quasi-period. With variation of system parameters, such as rotating speed, imbalance and external damping, chaotic response can be observed, along with other complex dynamics such as period- doubling bifurcation and torus bifurcation in the response.
UR - http://www.scopus.com/inward/record.url?scp=0141727703&partnerID=8YFLogxK
U2 - 10.1016/S0960-0779(03)00306-0
DO - 10.1016/S0960-0779(03)00306-0
M3 - 文章
AN - SCOPUS:0141727703
SN - 0960-0779
VL - 19
SP - 1161
EP - 1172
JO - Chaos, Solitons and Fractals
JF - Chaos, Solitons and Fractals
IS - 5
ER -