Unitaries Permuting Two Orthogonal Projections
Abstract
Let P and Q be two orthogonal projections on a separable Hilbert space, . Wang, Du and Dou proved that there exists a unitary, U, with UPU-1 =Q, UQU-1 = P if and only if ( P (1-Q)) = ( Q (1-P)) (both may be infinite). We provide a new proof using the supersymmetric machinery of Avron, Seiler and Simon.
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