Title :
Steady-state analysis of multitone nonlinear circuits in wavelet domain
Author :
Soveiko, Nick ; Nakhla, Michel S.
Author_Institution :
Dept. of Electron., Carleton Univ., Ottawa, Ont., Canada
fDate :
3/1/2004 12:00:00 AM
Abstract :
This paper introduces a new approach to steady-state analysis of nonlinear microwave circuits under periodic excitation. The new method is similar to the well-known technique of harmonic balance, but uses wavelets as basis functions instead of Fourier series. Use of wavelets allows significant increase in sparsity of the equation matrices and, consequently, decrease in CPU cost and storage requirements, while retaining accuracy and convergence of the traditional approach. The new method scales linearly with the size of the problem and is well suited for simulations of highly nonlinear, multitone, and broad-band circuits.
Keywords :
Newton method; computational complexity; convergence of numerical methods; harmonic analysis; microwave circuits; nonlinear network analysis; transfer function matrices; wavelet transforms; Gilbert-cell-mixer; Newton iterations; convergence; derivative operator; generalized matrix formulation; harmonic analysis; multitone nonlinear circuits; nonlinear microwave circuits; periodic excitation; sparsity pattern; steady-state analysis; time-frequency analysis; transform matrix; wavelet domain; Central Processing Unit; Convergence; Costs; Fourier series; Microwave circuits; Nonlinear circuits; Nonlinear equations; Steady-state; Wavelet analysis; Wavelet domain;
Journal_Title :
Microwave Theory and Techniques, IEEE Transactions on
DOI :
10.1109/TMTT.2004.823539
