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A Faster Quantum Fourier Transform

We present an asymptotically improved algorithm for implementing the Quantum Fourier Transform (QFT) in both the exact and approximate settings. Historically, the approximate QFT has been implemented in $Θ(n \log n)$ gates, and the exact in $Θ(n^2)$ gates. In this work, we show that these costs can be reduced by leveraging a novel formulation of the QFT that recurses on two partitions of the qubits. Specifically, our approach yields an $Θ(n(\log \log n)^2)$ algorithm for the approximate QFT using $Θ(\log n)$ ancillas, and an $Θ(n(\log n)^2)$ algorithm for the exact QFT requiring $Θ(n)$ ancillas.

View a PDF of the paper titled A Faster Quantum Fourier Transform, by Ronit Shah View PDFHTML (experimental) Abstract:We present an asymptotically improved algorithm for implementing the Quantum Fourier Transform (QFT) in both the exact and approximate settings. In this work, we show that these costs can be reduced by leveraging a novel formulation of the QFT that recurses on two partitions of the qubits.

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