A novel linear algebra method for the determination of periodic steady states of nonlinear oscillators

机译：确定非线性振荡器周期稳态的一种新的线性代数方法

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Periodic steady-state (PSS) analysis of nonlinear oscillators has always been a challenging task in circuit simulation. We present a new way that uses numerical linear algebra to identify the PSS(s) of nonlinear circuits. The method works for both autonomous and excited systems. Using the harmonic balancing method, the solution of a nonlinear circuit can be represented by a system of multivariate polynomials. Then, a Macaulay matrix based root-finder is used to compute the Fourier series coefficients. The method avoids the difficult initial guess problem of existing numerical approaches. Numerical examples show the accuracy and feasibility over existing methods.

机译：非线性振荡器的周期性稳态（PSS）分析一直是电路仿真中的一项艰巨任务。我们提出了一种使用数值线性代数来识别非线性电路的PSS的新方法。该方法适用于自主系统和励磁系统。使用谐波平衡方法，非线性电路的解可由多元多项式系统表示。然后，基于Macaulay矩阵的寻根器用于计算傅立叶级数系数。该方法避免了现有数值方法的困难的初始猜测问题。数值算例表明了现有方法的准确性和可行性。

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《IEEE/ACM International Conference on Computer-Aided Design》|2014年|611-617|共7页
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Haotian Liu; Batselier Kim; Ngai Wong;
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Fourier series; circuit simulation; oscillators; polynomial matrices; Fourier series coefficients; Macaulay matrix based root-finder; PSS analysis; circuit simulation; harmonic balancing method; multivariate polynomial system; nonlinear circuits; nonlinear oscillators; numerical linear algebra method; periodic steady state analysis; Harmonic analysis; Integrated circuit modeling; Null space; Oscillators; Polynomials; Vectors; Macaulay matrix; Steady-state analysis; autonomous oscillator; nonlinear circuit simulation;

机译：傅里叶级数;电路仿真;振荡器;多项式矩阵;傅立叶级数系数;基于Macaulay矩阵的寻根器; PSS分析;电路仿真;谐波平衡法;多元多项式系统;非线性电路;非线性振荡器;数值线性代数法;周期稳态分析;谐波分析;集成电路建模;零空间;振荡器;多项式;向量; Macaulay矩阵;稳态分析;自治振荡器;非线性电路仿真;

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专利

1. Determination of periodic orbits of nonlinear oscillators by means of piecewise-linearization methods [J] . Ramos JI Chaos, Solitons and Fractals: Applications in Science and Engineering: An Interdisciplinary Journal of Nonlinear Science . 2006,第5期

机译：用分段线性化方法确定非线性振荡器的周期轨道
2. Determination of periodic solutions for nonlinear oscillators with fractional powers by He’s modified Lindstedt-Poincaré method [J] . Ahmet Yildirim Meccanica . 2010,第1期

机译：用He改进的Lindstedt-Poincaré方法确定分数功率非线性振荡器的周期解
3. Determination of periodic solutions for nonlinear oscillators with fractional powers by He's modified Lindstedt-Poincar, method [J] . Yildirim A Meccanica: Journal of the Italian Association of Theoretical and Applied Mechanics . 2010,第1期

机译：用He's改进的Lindstedt-Poincar方法确定具有分数幂的非线性振荡器的周期解
4. An efficient homotopy-based Poincaré-Lindstedt method for the periodic steady-state analysis of nonlinear autonomous oscillators [C] . Zhongming Chen, Kim Batselier, Haotian Liu, . 2017

机译：一种基于同伦的有效Poincaré-Lindstedt方法，用于非线性自治振荡器的周期性稳态分析
5. Theoretical and experimental studies of steady state nonlinear localization and energy pumping in systems of coupled oscillators. [D] . Jiang, Xiaoai. 2002

机译：耦合振荡器系统中稳态非线性局部化和能量泵浦的理论和实验研究。
6. One class of meromorphic solutions of general two-dimensional nonlinear equations connected with the algebraic inverse scattering method [O] . D. V. Chudnovsky 1978

机译：一类一般的二维非线性方程的亚纯解与代数逆散射法联系起来
7. A novel linear algebra method for the determination of periodic steady states of nonlinear oscillators [O] . Batselier K, Wong N, Liu H 2014

机译：一种新的线性代数方法确定非线性振子的周期稳态
8. An Algebraic Method for Steady-State Responses of Linear State Equations with Periodic Input. [R] . Shieh, L. S. 1974

机译：具周期输入的线性状态方程稳态响应的代数方法。

A novel linear algebra method for the determination of periodic steady states of nonlinear oscillators

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