Ledermann, W. (1938), The orthogonal transformation of a factorial matrix into itself, "Psychometrika", 3, pp. 181-187.The orthogonal transformations of a factorial matrix into itself - Lederman - 1938 () Citation Context ...sma and the reviewers for useful comments. 1sCONDITIONS FOR FACTOR ...
differentiation of matrix orthogonal transformationsdiscrete-time matrix Riccati equationdiscrete-time matrix Riccati sensitivity equationNew numerical algorithms for differentiating matrix orthogonal transformations are constructed. They do not require that the derivatives of the orthogonal transformation matrix be ...
(The transformation is alternatively written M′=T-1MT.) When the matrix R is orthogonal, we have an orthogonal transformation: M′=RMR˜. When the transformation matrix is unitary, we have a unitary transformation: M′=UMU†. All similarity transformations preserve the form of matrix ...
2) Calibration transformation matrix 校正变换矩阵法 1. Adulteration detection method on edible oils by microwave-assisted derivatization and GC-MS coupled with calibration transformation matrix; 微波辅助衍生GC-MS测定校正变换矩阵法应用于食用植物油的识别 2. An adulteration detection method on edible ...
2.An adulteration detection method on edible oils by microwave assisted derivatization and GC MS to determinate fatty acids coupled with calibration transformation matrix was developed.建立了微波辅助衍生化GC MS测定植物油中的脂肪酸含量 ,使用校正变换矩阵法对食用植物油的成份进行测定的方法。
Why the determinant of a rotation matrix is either +1 or -1? Answers given by ChatGPT The determinant of a rotation matrix is always either +1 or -1 due to the properties of rotations in three-dimensional space. A rotation matrix represents a linear transformation that rotates points around...
the group of rotations of the given Euclidean space about the origin. In three-dimensional space an orthogonal transformation reduces to a rotation through a certain angle about some axis passing through the originO, if the determinant of the corresponding orthogonal matrix is +1. If the determina...
bounded linear transformation 有界线性变换 general linear transformation 一般线性变换 internal linear transformation 内部线性变换 linear fraction transformation 线性分式变换 matrix of a linear transformation 线性变换矩阵 unipotent linear transformation 幂幺线性变换, 幂单线性变换 相似...
orthogonal transformation[计]正交变换 orthogonal projection正投影,正交投影;正射影,正射投影 orthogonal function正交函数 orthogonal cutting垂直切割 orthogonal polynomial正交多项式 orthogonal basis正交基底 orthogonal matrix[计]正交矩阵 更多收起词组短语 双语例句 ...
We can express this transformation in the form of a matrix postmultiplied by a vector. That is, we can let a*=[a1*a2*] denote the new coordinates of the point a by the following substitution: [a1*a2*]=[cosθ11cosθ21cosθ12cosθ22] [a1a2][2.23−0.13...