Non-linear Volterra IDE, infinite systems and normal forms of ODE

In this paper, a modified approach for obtaining normal forms of non-linear dynamical systems is described. This approach provides a number of significant advantages over the existing normal form theory, and improves the associated calculations. A brief discussion concerning the application of the n

In this paper we investigate equivalence between control systems under timeindependent feedback transformations. We give a variation of the Pfaff theorem and use this to derive normal forms for control linear systems in \(n\) states and \(n-1\) controls under suitable regularity conditions, both in

The Karhunen}Loeve (K}L) decomposition procedure is applied to a system of coupled cantilever beams with non-linear grounding sti!nesses and a system of non-linearly coupled rods. The former system possesses localized non-linear normal modes (NNMs) for certain values of the coupling parameters and h