Abstract
It is possible to obtain insight in the chaotic nature of a
nonlinear oscillator by means of a study of the eigenvalues of the
linearized Jacobian of the differential equations describing the
oscillator. The movements of the eigenvalues as functions of time
are found. The instantaneous power in the enegy storing elements
is investigated. A Colpitts oscillator with chaotic behaviour is
used as an example.
| Original language | English |
|---|---|
| Title of host publication | Proceedings 5th International Specialist Workshop on Nonlinear Dynamics of Electronic Systems |
| Place of Publication | Moscow |
| Publisher | Moscow Technical University of Communications and Informatics |
| Publication date | 1997 |
| Pages | 1-580 |
| Publication status | Published - 1997 |
| Event | NDES'97 - 5th Internationa Specialist Workshop on
Nonlinear Dynamics of Electronic Systems - Moscow, Russia, June 26-27, 1997 Duration: 1 Jan 1997 → … |
Conference
| Conference | NDES'97 - 5th Internationa Specialist Workshop on Nonlinear Dynamics of Electronic Systems |
|---|---|
| City | Moscow, Russia, June 26-27, 1997 |
| Period | 01/01/1997 → … |