Convergence analysis of waveform relaxation for nonlineardifferential-algebraic equations of index one

Yao-Lin Jiang; Chen R.M.M.; Wing O.

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Convergence analysis of waveform relaxation for nonlineardifferential-algebraic equations of index one

机译：指数为1的非线性微分-代数方程的波形弛豫的收敛性分析

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We give a new and simple convergence theorem on the waveform relaxation (WR) solution for a system of nonlinear differential-algebraic equations of index one. We show that if the norms of certain matrices derived from the Jacobians of the system functions are less than one, then the WR solution converges. The new sufficient condition includes previously reported conditions as special cases. Examples are given to confirm the theoretical analysis

机译：我们针对指数为1的非线性微分-代数方程组的波形松弛（WR）解给出了一个新的简单收敛定理。我们证明，如果从系统函数的雅可比矩阵推导的某些矩阵的范数小于1，则WR解收敛。新的充分条件包括以前报告的条件作为特殊情况。举例说明理论分析

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《IEEE Transactions on Circuits and Systems. I, Regular Papers》 |2000年第11期|p.1639-1645|共7页
作者
Yao-Lin Jiang; Chen R.M.M.; Wing O.;
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正文语种 eng
中图分类 TN71;
关键词
circuit simulation; convergence of numerical methods; iterative methods; nonlinear differential equations; nonlinear network analysis; Jacobians; convergence analysis; nonlinear differential-algebraic equations; system functions; waveform relaxation;

机译：电路仿真;数值方法的收敛性;迭代法;非线性微分方程;非线性网络分析;Jacobians;收敛性;非线性微分代数方程;系统函数;波形弛豫;

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3. Convergence analysis of waveform relaxation for nonlinear differential-algebraic equations of index one [J] . Yao-Lin Jiang, Chen R.M.M. IEEE Transactions on Circuits and Systems. 1 . 2000,第11期

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Convergence analysis of waveform relaxation for nonlineardifferential-algebraic equations of index one

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