eigenvalue of a square matrixphr. 特征值,方阵的固有值 eigenvalue of a matrixphr. 方阵的固有值 matrix eigenvalue矩阵特征值,矩阵特征值 characteristics root of a matrix矩阵特征根,矩阵特征根 integration of a matrix矩阵的积分,矩阵的积分 singular values of a matrix矩阵奇异值,矩阵奇异值 ...
Noun1.eigenvalue of a matrix- (mathematics) any number such that a given square matrix minus that number times the identity matrix has a zero determinant characteristic root of a square matrix,eigenvalue,eigenvalue of a square matrix value- a numerical quantity measured or assigned or computed;...
eigenvalue of a square matrix [网络] 方阵的特征值
Define the matrix A n as the sum of D n = ( d ij) and C n, where d ij = 1 when i| j and zero when i ∤ j, and where C n = (0, 1, 1, …, 1) T(1, 0, 0, …, 0). We use the Geršgorin disc theorem and previous results regarding the spectral radiusand ...
mean values of Erdos-Hooley delta function 54:07 A two dimesnional delta methods and applications 59:06 100% of quadratic twists have no integral points 52:53 A lower bound on high moments of character sums 50:43 Drappeau:q-pochhammer symbols and modulartity 56:29 Explicit estimate...
Using intuition and computer experimentation, Brady conjectured that the ratio of the subdominant eigenvalue to the dominant eigenvalue of a positive random matrix (with identically and independently distributed entries) converges to zero when the number of the sectors tends to infinity. In this ...
For a complex square matrix, we present an eigenvalue–eigenvector equality for its semi-simple eigenvalue with a basis of the corresponding eigenspace under the condition that the eigenspace is orthogonal to eigenspaces or generalized eigenspaces corresponding to all other eigenvalues of the matrix....
The estimator of the second largest eigenvalue, along with those of two nuisance parameters, can be shown to converge to their true values in probability, and a form of the central limit theorem is proved. Explicit expressions for the bias and variance of the asymptotic distribution of this ...
Some modified matrix eigenvalue problems