diagonalmatriser
Diagonalmatriser, in mathematical terminology, refer to diagonal matrices. A diagonalmatris is a square matrix in which all entries outside the main diagonal are zero. The entries along the main diagonal may be zero or nonzero. It is common to denote such a matrix as D = diag(d1, d2, ..., dn), where D[i,i] = di for i = 1,...,n.
Diagonalmatriser form a simple, highly structured class of matrices. The product of two diagonalmatriser is diagonal,
Eigenstructure and applications
For a diagonalmatris, the diagonal entries are its eigenvalues, and standard basis vectors are the corresponding
Diagonalmatriser provide a concise and computationally convenient representation of linear transformations that act independently on each