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fourier_checking

class qiskit.circuit.library.fourier_checking(f, g)

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Bases:

Fourier checking circuit.

The circuit for the Fourier checking algorithm, introduced in [1], involves a layer of Hadamards, the function ff, another layer of Hadamards, the function gg, followed by a final layer of Hadamards. The functions ff and gg are classical functions realized as phase oracles (diagonal operators with {-1, 1} on the diagonal).

The probability of observing the all-zeros string is p(f,g)p(f,g). The algorithm solves the promise Fourier checking problem, which decides if f is correlated with the Fourier transform of g, by testing if p(f,g)<=0.01p(f,g) <= 0.01 or p(f,g)>=0.05p(f,g) >= 0.05, promised that one or the other of these is true.

The functions ff and gg are currently implemented from their truth tables but could be represented concisely and implemented efficiently for special classes of functions.

Fourier checking is a special case of kk-fold forrelation [2].

Reference Circuit:

from qiskit.circuit.library import fourier_checking
circuit = fourier_checking([1, -1, -1, -1], [1, 1, -1, -1])
circuit.draw('mpl')
../_images/qiskit-circuit-library-fourier_checking-1.png

Reference:

[1] S. Aaronson, BQP and the Polynomial Hierarchy, 2009 (Section 3.2). arXiv:0910.4698

[2] S. Aaronson, A. Ambainis, Forrelation: a problem that optimally separates quantum from classical computing, 2014. arXiv:1411.5729

Parameters

Return type

QuantumCircuit

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