Nonlinear vibration, stability, and bifurcation analysis of unbalanced spinning pre-twisted beam

Abstract: In this paper, an Euler–Bernoulli model has been used for nonlinear vibration, stability, and bifurcation analysis of spinning twisted beams with linear twist angle, and with large transverse deflections, near the primary and parametric resonances. The equations of motion, in the case of pure single mode motion are analyzed by two methods: directly applying multiple scales method and using multiple scales method after discretization by Galerkin’s procedure. It is observed that the same final relations are obta… Show more

“…The dynamics of the beams are important problem in the elastokinetics [1]. Tajik [2] proposed the stability analysis of motion equations of unbalanced spinning pre-twisted beam. Dai [3] investigated the limit point bifurcations and jump of cantilevered microbeams according to Galerkin method and modal truncation.…”

“…Let ∥u∥ ≡ ∥u∥ L 2 (D) ,∥u∥ s ≡ ∥u∥ H s 0 (D) ,(u, v) ≡ (u, v) L 2 (D) ,(u, v) s = (u, v) H s 0 (D) , where H s (D), H s 0 (D), s ∈ R are the usual Sobolev Spaces,for more detailed, see [26]. A = ∆ 2 with boundary condition (2), then D(A) = {u|u ∈ H 4 (D) H 1 0 (D), ∆u = 0}, and then A is self-adjoint, positive, unbounded linear operators and A −1 ∈ L (L 2 (D)) is compact. then, their eigenvalues {λ i } i∈N satisfy 0 < λ 1 ≤ λ 2 ≤ • • • → ∞ and the corresponding eigenvalues {e i } ∞ i=1 form an orthonormal basis in L 2 (D).…”

Global stability of the Euler- Bernoulli beams excited by multiplicative white noises

“…The dynamics of the beams are important problem in the elastokinetics [1]. Tajik [2] proposed the stability analysis of motion equations of unbalanced spinning pre-twisted beam. Dai [3] investigated the limit point bifurcations and jump of cantilevered microbeams according to Galerkin method and modal truncation.…”

“…Let ∥u∥ ≡ ∥u∥ L 2 (D) ,∥u∥ s ≡ ∥u∥ H s 0 (D) ,(u, v) ≡ (u, v) L 2 (D) ,(u, v) s = (u, v) H s 0 (D) , where H s (D), H s 0 (D), s ∈ R are the usual Sobolev Spaces,for more detailed, see [26]. A = ∆ 2 with boundary condition (2), then D(A) = {u|u ∈ H 4 (D) H 1 0 (D), ∆u = 0}, and then A is self-adjoint, positive, unbounded linear operators and A −1 ∈ L (L 2 (D)) is compact. then, their eigenvalues {λ i } i∈N satisfy 0 < λ 1 ≤ λ 2 ≤ • • • → ∞ and the corresponding eigenvalues {e i } ∞ i=1 form an orthonormal basis in L 2 (D).…”

Global stability of the Euler- Bernoulli beams excited by multiplicative white noises

Nonlinear dynamic analysis of a rotating pre-twisted blade with elastic boundary

Dynamic modeling and analysis of an axially moving and spinning Rayleigh beam based on a time-varying element