U3 Ad Page 1 STABILIZATION BY A DIAGONAL MATRIX CS BALLANTINE Abstract. In this
paper it is shown that, given a complex square matrix A all of whose leading principal minors …

… whose positive elements are just the positive diagonal elements of -J . For the sake of …
non-negative diagonal matrix P whose positive elements are just the positive diagonal elements of …

… just by computing the matrix corresponding to the multiplication … matrix [21], much more
complicated than the Jacobi matrix … giving a five-diagonal matrix representation of orthogonal …

… P a diagonal matrix, with all diagonal entries positive, referred to briefly as a positive diagonal
matrix… More generally, these are functions that are conducive to the use of matrix diagonal …

… (6) the best that we can do is to select the vectors vk in such a way that matrix VV is as close
to a diagonal matrix as possible. Of course, if the number of vectors vk is smaller than the …

… A diagonal matrix is one whose non-diagonal elements vanish. The identity matrix is the
diagonal matrix with diagonal (1, * , 1). A permutation matrix is a matrix with elements all 0 or 1 …

… -diagonal matrix elements. Motivated by this nonequilibrium role, we present generic statistical
properties of off-diagonal matrix … distribution of off-diagonal matrix elements is a Gaussian …

… diagonal matrices. As illustrated in Fig. 1(b), permuted diagonal matrix is a type of structured
sparse matrix that places all the non-zero entries in the diagonal or permuted diagonal. …

… of diagonal matrix scaling: Given an n x n symmetric positive semidefinite matrix A, either
find a positive diagonal matrix X, which scales A into a doubly quasi-stochastic matrix …

… The spectral symbols behave nicely only on the sequences of hermitian matrices, but when
we work with diagonal matrices, not necessarily with real entries, we can also regain some …