Rational orthogonal approximations to orthogonal matrices

The well-known connection between Pad6 approximants to Stieltjes functions and orthogonal polynomials is crucial in locating zeros and poles and in convergence theorems. In the present paper we extend similar types of analysis to more elaborate forms of approximation. It transpires that the link wit

Let S ∈ M n (R) be such that S 2 = I or S 2 = -I. is unitary, and both factors are φ S -orthogonal. We show that if A is φ Sorthogonal and normal, and if -1 is not an eigenvalue of A, then there exists a normal φ S -skew symmetric N (that is, φ S (N) = -N) such that A = e iN . We also take a look a

When one wants to use Orthogonal Rational Functions (ORFs) in system identification or control theory, it is important to be able to avoid complex calculations. In this paper we study ORFs whose numerator and denominator polynomial have real coefficients. These ORFs with real coefficients (RORFs) ap

The minimum number of nonzero entries in an n by n orthogonal matrix which has a column of nonzeros is known to be In this note the sparsity of orthogonal matrices which have both a column and a row of nonzeros is studied. For each integer n 2 we construct an n by n orthogonal matrix which has both