Related papers: Quantum Circuit for Quantum Fourier Transform for Arbitrary Qubit Connectivity Graphs

Quantum Circuit for Quantum Fourier Transform for Arbitrary Qubit Connectivity Graphs

URL: http://arxiv.org/abs/2510.09824v1
Date: Fri, 10 Oct 2025 19:54:00 GMT
Title: Quantum Circuit for Quantum Fourier Transform for Arbitrary Qubit Connectivity Graphs
Authors: Kamil Khadiev, Aliya Khadieva, Vadim Sagitov, Kamil Khasanov,
Abstract summary: Many quantum devices (for example, based on superconductors) have restrictions on applying two-qubit gates.<n>We present a method for arbitrary connected graphs that minimizes the number of CNOT gates in the circuit for implementing on such architecture.
Score: 0.0
License: http://arxiv.org/licenses/nonexclusive-distrib/1.0/
Abstract: In the paper, we consider quantum circuits for the Quantum Fourier Transform (QFT) algorithm. The QFT algorithm is a very popular technique used in many quantum algorithms. We present a generic method for constructing quantum circuits for this algorithm implementing on quantum devices with restrictions. Many quantum devices (for example, based on superconductors) have restrictions on applying two-qubit gates. These restrictions are presented by a qubit connectivity graph. Typically, researchers consider only the linear nearest neighbor (LNN) architecture of the qubit connection, but current devices have more complex graphs. We present a method for arbitrary connected graphs that minimizes the number of CNOT gates in the circuit for implementing on such architecture. We compare quantum circuits built by our algorithm with existing quantum circuits optimized for specific graphs that are Linear-nearest-neighbor (LNN) architecture, ``sun'' (a cycle with tails, presented by the 16-qubit IBMQ device) and ``two joint suns'' (two joint cycles with tails, presented by the 27-qubit IBMQ device). Our generic method gives similar results with existing optimized circuits for ``sun'' and ``two joint suns'' architectures, and a circuit with slightly more CNOT gates for the LNN architecture. At the same time, our method allows us to construct a circuit for arbitrary connected graphs.

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