论文信息 - On the Factorization of Hyperbolic and Unitary Transformations into Rotations

On the Factorization of Hyperbolic and Unitary Transformations into Rotations

This paper presents a $\Sigma$-unitary analogue to the CS decomposition of a partitioned unitary matrix. The hyperbolic rotations revealed by the decomposition are shown to be optimal in that, among a broader class of decompositions of $\Sigma$-unitary matrices into elementary hyperbolic rotations, they are the smallest possible in a sum-of-squares sense. A similar optimality property is shown to hold for the sines in the CS decomposition of a unitary matrix.

Paul Van Dooren | Michael Stewart

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