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Diabatic quantum annealing for the frustrated ring model

Jeremy Côté, Frédéric Sauvage, Martín Larocca, Matías Jonsson, Łukasz Cincio, Tameem Albash

2023Quantum Science and Technology14 citationsDOIOpen Access PDF

Abstract

Abstract Quantum annealing (QA) is a continuous-time heuristic quantum algorithm for solving or approximately solving classical optimization problems. The algorithm uses a schedule to interpolate between a driver Hamiltonian with an easy-to-prepare ground state and a problem Hamiltonian whose ground state encodes solutions to an optimization problem. The standard implementation relies on the evolution being adiabatic: keeping the system in the instantaneous ground state with high probability and requiring a time scale inversely related to the minimum energy gap between the instantaneous ground and excited states. However, adiabatic evolution can lead to evolution times that scale exponentially with the system size, even for computationally simple problems. Here, we study whether non-adiabatic evolutions with optimized annealing schedules can bypass this exponential slowdown for one such class of problems called the frustrated ring model. For sufficiently optimized annealing schedules and system sizes of up to 39 qubits, we provide numerical evidence that we can avoid the exponential slowdown. Our work highlights the potential of highly-controllable QA to circumvent bottlenecks associated with the standard implementation of QA.

Topics & Concepts

Quantum annealingAdiabatic processAdiabatic quantum computationDiabaticSimulated annealingHamiltonian (control theory)QubitGround stateQuantumStatistical physicsScheduleExponential functionComputer scienceMathematical optimizationPhysicsQuantum computerQuantum mechanicsMathematicsMathematical analysisOperating systemQuantum Computing Algorithms and ArchitectureQuantum Information and CryptographyQuantum-Dot Cellular Automata
Diabatic quantum annealing for the frustrated ring model | Litcius