Bounds for the inequality of Wielandt

The Kantorovich±Wielandt angle he and the author's operator angle /e are related by cos /e 2 sin he. Here A is an arbitrary symmetric positive de®nite (SPD) matrix. The relationship of these two dierent geometrical perspectives is discussed. An extension to arbitrary nonsingular matrices A is given.

Let A be an n × n positive definite symmetric real matrix with n eigenvalues λ 1 , λ 2 , . . . , λ n and let x and y be two n × 1 vectors with the angle ψ. This paper proves the following inequality (x T Ax)(y T Ay).

Suppose that A is an n  n positive de®nite Hermitian matrix. Let X and Y be n  p and n  q matrices, respectively, such that X à Y 0. The present article proves the following inequality, where k 1 and k n are respectively the largest and smallest eigenvalues of A, and M À stands for a generalized