Physics – Quantum Physics
Scientific paper
2005-09-28
Physics
Quantum Physics
14 pages, 4 figures, to appear in Quantum Information & Computation, vol. 6, no. 1, 067-080 (2006)
Scientific paper
We provide a new algorithm that translates a unitary matrix into a quantum circuit according to the G=KAK theorem in Lie group theory. With our algorithm, any matrix decomposition corresponding to type-AIII KAK decompositions can be derived according to the given Cartan involution. Our algorithm contains, as its special cases, Cosine-Sine decomposition (CSD) and Khaneja-Glaser decomposition (KGD) in the sense that it derives the same quantum circuits as the ones obtained by them if we select suitable Cartan involutions and square root matrices. The selections of Cartan involutions for computing CSD and KGD will be hown explicitly. As an example, we show explicitly that our method can automatically reproduce the well-known efficient quantum circuit for the n-qubit quantum Fourier transform.
Kawano Yasuhito
Nakajima Yumi
Sekigawa Hiroshi
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