Energy integrals for the systems with nonholonomic constraints of arbitrary form and origin

“…Incorporating: λ 1 , λ 2 , λ 3 , and λ 4 as four new unknowns, (7) and (9) give ten equations with ten variables. Solving these equations, the expressions for Lagrange multipliers and equations of motion, i.e.…”

“…Moreover, stability of the specific mechanical system was discussed using different approaches. Namely, unlike the papers [8] and [9], where the relative advantages and disadvantages of various analytical methods of nonholonomic systems are briefly presented, the problem of the instability of the equilibrium state of a scleronomic mechanical system with linear homogeneous constraints are considered in [10], and the problem of the stability of the equilibrium state in the case with holonomic mechanical systems in [11].…”

Analysis of the motion and stability of the holonomic mechanical system in the arbitrary force field

“…Incorporating: λ 1 , λ 2 , λ 3 , and λ 4 as four new unknowns, (7) and (9) give ten equations with ten variables. Solving these equations, the expressions for Lagrange multipliers and equations of motion, i.e.…”

“…Moreover, stability of the specific mechanical system was discussed using different approaches. Namely, unlike the papers [8] and [9], where the relative advantages and disadvantages of various analytical methods of nonholonomic systems are briefly presented, the problem of the instability of the equilibrium state of a scleronomic mechanical system with linear homogeneous constraints are considered in [10], and the problem of the stability of the equilibrium state in the case with holonomic mechanical systems in [11].…”

Analysis of the motion and stability of the holonomic mechanical system in the arbitrary force field

New methods to find solutions and analyze stability of equilibrium of nonholonomic mechanical systems

One kind motion of controllable constrained Birkhoffian system: the absence of constraints