On the Birman-Krein Theorem
Abstract
It is shown that if X is a unitary operator so that a singular subspace of~U is unitarily equivalent to a singular subspace of~UX (or XU), for each unitary operator~U, then X is the identity operator. In other words, there is no nontrivial generalization of Birman-Krein Theorem that includes the preservation of a singular spectral subspace in this context.
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