Title | ||
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Two-sided projection method in variational equation model order reduction of nonlinear circuits |
Abstract | ||
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For relatively strong nonlinear circuits, the conventional variational order reduction method loses efficiency due to the exponentially increased number of inputs and the one-sided projection technique. In this paper, we propose a two-sided projection approach which is capable of matching a much higher number of moments than the one-sided projection method. We show by theoretical analysis and experiments that the two-sided projection method is very efficient for the variational equation model order reduction of nonlinear circuits. |
Year | DOI | Venue |
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2004 | 10.1109/ISCAS.2004.1329129 | ISCAS (4) |
Keywords | Field | DocType |
variational techniques,one-sided projection technique,two-sided projection method,integrated circuit modelling,analogue integrated circuits,reduced order systems,theoretical analysis,nonlinear systems,nonlinear circuits,variational equation model,conventional variational order reduction method,nonlinear equations,educational technology,taylor series,application specific integrated circuits,projection method,microelectronics,linear systems | Variational equation,Nonlinear system,Model order reduction,Control theory,Mathematical analysis,Projection method,Order reduction,Nonlinear circuits,Mathematics,Exponential growth | Conference |
Volume | ISBN | Citations |
4 | 0-7803-8251-X | 0 |
PageRank | References | Authors |
0.34 | 4 | 5 |
Name | Order | Citations | PageRank |
---|---|---|---|
Lihong Feng | 1 | 55 | 9.23 |
Xuan Zeng | 2 | 408 | 75.96 |
Jiarong Tong | 3 | 68 | 11.74 |
Charles Chiang | 4 | 129 | 12.13 |
Dian Zhou | 5 | 260 | 56.14 |