Title :
Efficient linear circuit analysis by Pade approximation via the Lanczos process
Author :
Feldmann, Peter ; Freund, Roland W.
Author_Institution :
AT&T Bell Labs., Murray Hill, NJ, USA
fDate :
5/1/1995 12:00:00 AM
Abstract :
In this paper, we introduce PVL, an algorithm for computing the Pade approximation of Laplace-domain transfer functions of large linear networks via a Lanczos process. The PVL algorithm has significantly superior numerical stability, while retaining the same efficiency as algorithms that compute the Pade approximation directly through moment matching, such as AWE and its derivatives. As a consequence, it produces more accurate and higher-order approximations, and it renders unnecessary many of the heuristics that AWE and its derivatives had to employ. The algorithm also computes an error bound that permits to identify the true poles and zeros of the original network. We present results of numerical experiments with the PVL algorithm for several large examples
Keywords :
Laplace transforms; circuit analysis computing; linear network analysis; numerical stability; poles and zeros; transfer functions; Lanczos process; Laplace-domain transfer functions; PVL; Pade approximation; efficiency; error bound; higher-order approximations; linear circuit analysis; numerical stability; poles; zeros; Algorithm design and analysis; Approximation algorithms; Circuit analysis; Circuit simulation; Computer networks; Differential equations; Frequency; Linear circuits; Poles and zeros; Reduced order systems;
Journal_Title :
Computer-Aided Design of Integrated Circuits and Systems, IEEE Transactions on
