A method for solving the dynamics of multibody systems with rheonomic and nonholonomic constraints

A&tract: Study of mechanical systans with unilateral constraints is associated with forming two systems of equations, a system of differential equations 4 a system of algebraical equations. Differential equations are used to describe the lrotion until the nmentof impact, i.e. until activation of uni

Multibody systems are frequently modeled as constrained systems, and the arising governing equations incorporate the closing constraint equations at the acceleration level. One consequence of accumulation of integration truncation errors is the phenomenon of violation of the lower-order constraint e

The paper presents a multi-index variable time step method for the integration of the equations of motion of constrained multibody systems in descriptor form. The basis of the method is the augmented Lagrangian formulation with projections in index-3 and index-1. The method takes advantage of the be

For an insulator chain and a multiple pendulum the equations of motion are given in descriptor form as differential-algebraic equations (DAEs) of index 2 and in state space form as ordinary differential equations (ODEs). The performance of two recently developed codes for the numerical solution of D