Citation: | SHI Meijiao, XU Huidong, ZHANG Jianwen. Non-Smooth Grazing Dynamics for Cantilever Beams With Bilateral Elastic Constraints[J]. Applied Mathematics and Mechanics, 2022, 43(6): 619-630. doi: 10.21656/1000-0887.420177 |
The grazing-induced non-smooth dynamical behaviors of single-degree-of-freedom cantilever beam systems with bilateral elastic constraints were studied. Firstly, based on the dynamical equations for the cantilever beam under elastic impacts and the definition of grazing points, the existence condition for the bilateral grazing periodic motion was analyzed. Secondly, the zero-velocity Poincaré section was selected to derive the high-order discontinuous mapping with parameters near bilateral grazing orbits. Then a new composite piecewise normal form mapping was established through combination of the smooth flow mapping and the high-order discontinuous mapping. Finally, the validity of the high-order mapping was verified through comparison of the bifurcation diagram of the low-order mapping with that of the high-order mapping, and the grazing dynamics of the cantilever beam under elastic impacts were further revealed through numerical simulation.
[1] |
NORDMARK A B. Non-periodic motion caused by grazing incidence in an impact oscillator[J]. Journal of Sound and Vibration, 1991, 145(2): 279-297.
NORDMARK A B. Non-periodic motion caused by grazing incidence in an impact oscillator[J]. Journal of Sound and Vibration, 1991, 145(2): 279-297.
|
[2] |
CHIN W, OTT E, NUSEE H E, et al. Grazing bifurcations in impact oscillators[J]. Physical Review E, 1994, 50(6): 4427-4444.
CHIN W, OTT E, NUSEE H E, et al. Grazing bifurcations in impact oscillators[J]. Physical Review E, 1994, 50(6): 4427-4444.
|
[3] |
LAMBA H, BUDD C J. Scaling of Lyapunov exponents at nonsmooth bifurcations[J]. Physical Review E, 1994, 50(1): 84-90.
LAMBA H, BUDD C J. Scaling of Lyapunov exponents at nonsmooth bifurcations[J]. Physical Review E, 1994, 50(1): 84-90.
|
[4] |
FREDRIKSSON M H, NORDMARK A B. Bifurcations caused by grazing incidence in many degrees of freedom impact oscillators[J]. Proceedings of the Royal Society of London, Series A: Mathematical, Physical and Engineering Sciences, 1997, 453(1961): 1261-1276.
FREDRIKSSON M H, NORDMARK A B. Bifurcations caused by grazing incidence in many degrees of freedom impact oscillators[J]. Proceedings of the Royal Society of London, Series A: Mathematical, Physical and Engineering Sciences, 1997, 453(1961): 1261-1276.
|
[5] |
LI Q H, WEI L M, AN J Y, et al. Double grazing periodic motions and bifurcations in a vibro-impact system with bilateral stops[J]. Hindawi Publishing Corporation Abstract and Applied Analysis, 2014: 1-9.
LI Q H, WEI L M, AN J Y, et al. Double grazing periodic motions and bifurcations in a vibro-impact system with bilateral stops[J]. Abstract and Applied Analysis, 2014, 2014: 642589.
|
[6] |
XU J Q, CHEN P, LI Q H. Theoretical analysis of co-dimension-two grazing bifurcations in n-degree-of-freedom impact oscillator with symmetrical constrains[J]. Nonlinear Dynamics, 2015, 82: 1641-1657.
XU J Q, CHEN P, LI Q H. Theoretical analysis of co-dimension-two grazing bifurcations in n-degree-of-freedom impact oscillator with symmetrical constrains[J]. Nonlinear Dynamics, 2015, 82: 1641-1657.
|
[7] |
WEGER J D, WILLEM V D W, MOLENAAR J. Grazing impact oscillations[J]. Physical Review E, 2000, 62(2): 2030.
WEGER J D, WILLEM V D W, MOLENAAR J. Grazing impact oscillations[J]. Physical Review E, 2000, 62(2): 2030.
|
[8] |
MOLENAAR J, WEGER J D, WILLEM V D W. Mappings of grazing-impact oscillators[J]. Nonlinearity, 2001, 14(2): 301-321.
MOLENAAR J, WEGER J D, WILLEM V D W. Mappings of grazing-impact oscillators[J]. Nonlinearity, 2001, 14(2): 301-321.
|
[9] |
ZHAO X P. Discontinuity mapping for near-grazing dynamics in vibro-impact oscillators[J]. Vibro-Impact Dynamics of Ocean Systems and Related Problems, 2009, 44: 275-285.
ZHAO X P. Discontinuity mapping for near-grazing dynamics in vibro-impact oscillators[J]. Vibro-Impact Dynamics of Ocean Systems and Related Problems, 2009, 44: 275-285.
|
[10] |
YIN S, WEN G L, XU H D, et al. Higher order zero time discontinuity mapping for analysis of degenerate grazing bifurcations of impacting oscillators[J]. Journal of Sound and Vibration, 2018, 437: 209-222.
YIN S, WEN G L, XU H D, et al. Higher order zero time discontinuity mapping for analysis of degenerate grazing bifurcations of impacting oscillators[J]. Journal of Sound and Vibration, 2018, 437: 209-222.
|
[11] |
CZOLCZYNSKI K, OKOLEWSKI A, BLAZEJCZK-OKOLEWSKA B. Lyapunov exponents in discrete modelling of a cantilever beam impacting on a moving base[J]. International Journal of Non-Linear Mechanics, 2017, 88: 74-84.
CZOLCZYNSKI K, OKOLEWSKI A, BLAZEJCZK-OKOLEWSKA B. Lyapunov exponents in discrete modelling of a cantilever beam impacting on a moving base[J]. International Journal of Non-Linear Mechanics, 2017, 88: 74-84.
|
[12] |
BLAZEJCZK-OKOLEWSKA B, CZOLCZYNSKI K, KAPITANIAK T. Dynamics of a two-degree-of-freedom cantilever beam with impacts[J]. Chaos, Solitons and Fractals, 2009, 40(4): 1991-2006.
BLAZEJCZK-OKOLEWSKA B, CZOLCZYNSKI K, KAPITANIAK T. Dynamics of a two-degree-of-freedom cantilever beam with impacts[J]. Chaos, Solitons and Fractals, 2009, 40(4): 1991-2006.
|