TY - JOUR
T1 - Nonlinear analysis of forced mechanical systemswith internal resonance using spectral submanifolds, Part I
T2 - Periodic response and forced response curve
AU - Li, Mingwu
AU - Jain, Shobhit
AU - Haller, George
PY - 2022
Y1 - 2022
N2 - We show how spectral submanifold theory can be used to construct reduced-order models for harmonically excited mechanical systems with internal resonances. Efficient calculations of periodic and quasi-periodic responses with the reduced-order models are discussed in this paper and its companion, Part II, respectively. The dimension of a reduced-order model is determined by the number of modes involved in the internal resonance, independently of the dimension of the full system. The periodic responses of the full system are obtained as equilibria of the reduced-order model on spectral submanifolds. The forced response curve of periodic orbits then becomes a manifold of equilibria, which can be easily extracted using parameter continuation. To demonstrate the effectiveness and efficiency of the reduction, we compute the forced response curves of several high-dimensional nonlinear mechanical systems, including the finite-element models of a von Kármán beam and a plate.
AB - We show how spectral submanifold theory can be used to construct reduced-order models for harmonically excited mechanical systems with internal resonances. Efficient calculations of periodic and quasi-periodic responses with the reduced-order models are discussed in this paper and its companion, Part II, respectively. The dimension of a reduced-order model is determined by the number of modes involved in the internal resonance, independently of the dimension of the full system. The periodic responses of the full system are obtained as equilibria of the reduced-order model on spectral submanifolds. The forced response curve of periodic orbits then becomes a manifold of equilibria, which can be easily extracted using parameter continuation. To demonstrate the effectiveness and efficiency of the reduction, we compute the forced response curves of several high-dimensional nonlinear mechanical systems, including the finite-element models of a von Kármán beam and a plate.
KW - Internal resonances
KW - Invariant manifolds
KW - Modal interactions
KW - Reduced-order models
KW - Spectral submanifolds
UR - http://www.scopus.com/inward/record.url?scp=85135600492&partnerID=8YFLogxK
U2 - 10.1007/s11071-022-07714-x
DO - 10.1007/s11071-022-07714-x
M3 - Article
AN - SCOPUS:85135600492
SN - 0924-090X
VL - 110
SP - 1005
EP - 1043
JO - Nonlinear Dynamics
JF - Nonlinear Dynamics
IS - 2
ER -