Dmitri Maslov, Jin-Sung Kim, et al.
QIP 2021
We consider the problem of mapping a logical quantum circuit onto a given hardware with limited 2-qubit connectivity. We model this problem as an integer linear program, using a network flow formulation with binary variables that includes the initial allocation of qubits and their routing. We consider several cost functions: an approximation of the fidelity of the circuit, its total depth, and a measure of cross-talk, all of which can be incorporated in the model. Numerical experiments on synthetic data and different hardware topologies indicate that the error rate and depth can be optimized simultaneously without significant loss. We test our algorithm on a large number of quantum volume circuits, optimizing for error rate and depth; our algorithm significantly reduces the number of CNOTs compared to Qiskit's default transpiler SABRE [19] and produces circuits that, when executed on hardware, exhibit higher fidelity.
Dmitri Maslov, Jin-Sung Kim, et al.
QIP 2021
Dennis Wei, Sanjeeb Dash, et al.
ICML 2019
Tony Metger, Omar Fawzi, et al.
QIP 2023
Jay Gambetta
QIP 2021