Citation: S. Foale et al., NUMERICAL DIMENSION-REDUCTION METHODS FOR NONLINEAR SHELL VIBRATIONS, Journal of sound and vibration, 215(3), 1998, pp. 527-545
Citation: Aa. Popov et al., LOW-DIMENSIONAL MODELS OF SHELL VIBRATIONS PARAMETRICALLY EXCITED VIBRATIONS OF CYLINDRICAL-SHELLS, Journal of sound and vibration, 209(1), 1998, pp. 163-186
Citation: G. Baker et al., IMPLICATIONS OF CHAOS THEORY FOR ENGINEERING SCIENCE, Proceedings of the Institution of Mechanical Engineers. Part C, Journal of mechanical engineering science, 211(5), 1997, pp. 349-363
Citation: Fa. Mcrobie, SYMPLECTIC-GEOMETRY AND VIBRATING SYSTEMS WITH PERIODIC COEFFICIENTS - COMMENT, Journal of sound and vibration, 187(2), 1995, pp. 344-344
Citation: Fa. Mcrobie et Jmt. Thompson, KNOT-TYPES AND BIFURCATION SEQUENCES OF HOMOCLINIC AND TRANSIENT ORBITS OF A SINGLE-DEGREE-OF-FREEDOM DRIVEN OSCILLATOR, Dynamics and stability of systems, 9(3), 1994, pp. 223-251
Citation: Fa. Mcrobie, BIRKHOFF SIGNATURE CHANGE - A CRITERION FOR THE INSTABILITY OF CHAOTIC RESONANCE, Philosophical transactions-Royal Society of London. Physical sciences and engineering, 338(1651), 1992, pp. 557-568