Generalized Fourier series for non-linear systems

Tangent spaces in non-linear dynamical systems are state dependent. Hence, it is generally not possible to exactly represent a non-linear dynamical system by a linear one over "nite segments of the evolving trajectories in the phase space. It is known from the well-known theorem of Hartman and Grobm

This paper deals with some aspects of eigenvalue placement by state feedback for generalized linear systems described by Ei = Ax + Bu, where E is a singular map. It is shown that controllability of the infinite eigenvalues of the pencil (SE -A) is equivalent to the existence of a state feedback map

A robust identification technique is presented which extracts the linear frequency response kernel from an input/response measurement of a general non-linear system. Also the number and significance of higher order frequency response kernels required for a complete identification may be assessed fro