On the Rank of a Jacobian Matrix of a Class of Nonlinear Equations (信号処理)
スポンサーリンク
概要
- 論文の詳細を見る
This paper shows a theorem on the rank of a Jacobian matrix of a class of nonlinear equations consisting of n variables and (n-1) equations and gives its proof. The theorem depends heavily on the properties of both the Ω-matrix and the irreducible matrix.
- 2012-03-01
著者
-
Nishi Tetsuo
Faculty Of Engineering Kyushu University
-
Takahashi Norikazu
Faculty Of Engineering Kyushu University
関連論文
- An Efficient Method for Simplifying Decision Functions of Support Vector Machines(Control, Neural Networks and Learning,Nonlinear Theory and its Applications)
- One-dimensional Discrete-time Binary Cellular Neural Networks and Some Examples for Signal Processing
- Necessary and Sufficient Conditions for One-Dimensional Discrete-Time Autonomous Binary Cellular Neural Networks to Be Stable(Nonlinear Problems)
- Necessary and Sufficient Conditions for a 1-D DBCNN with an Input to Be Stable in terms of Connection Coefficients(Control, Neural Networks and Learning,Nonlinear Theory and its Applications)
- On the Number of Solutions of a Class of Nonlinear Equations Related to Neural Networks with Tapered Connections
- Numerical Existence Proof of Five Solutions for Certain Two-Transistor Circuit Equations
- On the Rank of a Jacobian Matrix of a Class of Nonlinear Equations (信号処理)
- On the Rank of a Jacobian Matrix of a Class of Nonlinear Equations (通信方式)
- On the Rank of a Jacobian Matrix of a Class of Nonlinear Equations (回路とシステム)
- On the Rank of a Jacobian Matrix of a Class of Nonlinear Equations