Integrability and the variational formulation of non-conservative mechanical systems

A continuum-based variational principle is presented for the formulation of the discrete governing equations of partitioned structural systems. This application includes coupled substructures as well as subdomains obtained by mesh decomposition. The present variational principle is derived by a seri

The extension of Abel's Identity presented in the companion paper is used to construct the general solutions to some non-linear, autonomous systems. It is shown that only one first integral is required for the construction, and that one first integral naturally leads to a second independent integral

## Abstract The 17^th^ century is considered as the cradle of modern natural sciences and technology as well as the begin of the age of enlightenment with the invention of analytical geometry by R. Descartes (1637), infinitesimal calculus by I. Newton (1668) and G. W. Leibniz (1674), and based on t

## Abstract In this paper, the influence of small perturbation on a linear, non‐conservative dynamical system exhibiting a flutter type bifurcation has been investigated. An important role in considering design problems for non‐conservative structures plays the sensitivity analysis of the integral