Details
Original language | English |
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Title of host publication | Proceedings of 2009 2nd International Workshop on Nonlinear Dynamics and Synchronization |
Subtitle of host publication | INDS 2009 |
Publisher | IEEE Computer Society |
Pages | 89-94 |
Number of pages | 6 |
ISBN (print) | 9783832279431, 978-1-4244-3844-0 |
Publication status | Published - 2009 |
Event | 2009 2nd International Workshop on Nonlinear Dynamics and Synchronization, INDS 2009 - Klagenfurt, Austria Duration: 20 Jul 2009 → 21 Jul 2009 |
Abstract
It will seek the difficult problem of analysis of operating points of nonlinear electronic circuits, a novel methodical manner. In this work we describe the behavior of electrical circuits by a mixture of algebraic and differential equations. We show how to use a geometric interpretation and geometric algorithms to explicitly compute operation points for a special class of electronic circuits. We demonstrate this using the Van-Der-Pol-Oscillator in two different examples. To that end, we discuss how to trace curves on folded manifolds and show the problem on a suitable representation.
ASJC Scopus subject areas
- Computer Science(all)
- Computational Theory and Mathematics
- Computer Science(all)
- Computer Vision and Pattern Recognition
- Engineering(all)
- Control and Systems Engineering
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Proceedings of 2009 2nd International Workshop on Nonlinear Dynamics and Synchronization: INDS 2009. IEEE Computer Society, 2009. p. 89-94 5227971.
Research output: Chapter in book/report/conference proceeding › Conference contribution › Research › peer review
}
TY - GEN
T1 - Analysis of Jump Behavior in Nonlinear Electronic Circuits Using Computational Geometric Methods
AU - Mathis, Wolfgang
AU - Blanke, Philipp
AU - Gutschke, Martin
AU - Wolter, Franz Erich
PY - 2009
Y1 - 2009
N2 - It will seek the difficult problem of analysis of operating points of nonlinear electronic circuits, a novel methodical manner. In this work we describe the behavior of electrical circuits by a mixture of algebraic and differential equations. We show how to use a geometric interpretation and geometric algorithms to explicitly compute operation points for a special class of electronic circuits. We demonstrate this using the Van-Der-Pol-Oscillator in two different examples. To that end, we discuss how to trace curves on folded manifolds and show the problem on a suitable representation.
AB - It will seek the difficult problem of analysis of operating points of nonlinear electronic circuits, a novel methodical manner. In this work we describe the behavior of electrical circuits by a mixture of algebraic and differential equations. We show how to use a geometric interpretation and geometric algorithms to explicitly compute operation points for a special class of electronic circuits. We demonstrate this using the Van-Der-Pol-Oscillator in two different examples. To that end, we discuss how to trace curves on folded manifolds and show the problem on a suitable representation.
UR - http://www.scopus.com/inward/record.url?scp=70350439186&partnerID=8YFLogxK
U2 - 10.1109/inds.2009.5227971
DO - 10.1109/inds.2009.5227971
M3 - Conference contribution
AN - SCOPUS:70350439186
SN - 9783832279431
SN - 978-1-4244-3844-0
SP - 89
EP - 94
BT - Proceedings of 2009 2nd International Workshop on Nonlinear Dynamics and Synchronization
PB - IEEE Computer Society
T2 - 2009 2nd International Workshop on Nonlinear Dynamics and Synchronization, INDS 2009
Y2 - 20 July 2009 through 21 July 2009
ER -