Products of positive operators

Abstract: Abstract. A new, very simple proof is given of a result of P. Y. Wu which asserts that every unitary operator on an infinite-dimensional Hilbert space is a product of positive operators.A number of mathematicians have considered the problem of writing an operator as a product of "nice" operators, such as positive, hermitian or normal operators. Our principal reference for this is a paper of P. Y. Wu [6], but see also [2] and [5]. This kind of question, and related questions, have also been considered in a C *… Show more

“…where [14]. According to its reviewer, Qing Lin, "In this elegant short paper, Murphy provides an elementary and much simpler proof" of a theorem of P. Y. Wu to the effect that, in an infinitedimensional Hilbert space, any unitary operator is a product of 16 positive operators.…”

Gerard J. Murphy (1948--2006)

“…where [14]. According to its reviewer, Qing Lin, "In this elegant short paper, Murphy provides an elementary and much simpler proof" of a theorem of P. Y. Wu to the effect that, in an infinitedimensional Hilbert space, any unitary operator is a product of 16 positive operators.…”

Gerard J. Murphy (1948--2006)

Products of positive definite symplectic matrices