Litcius/Paper detail

A control theoretic analysis of oscillator Ising machines

Yi Cheng, Mohammad Khairul Bashar, Nikhil Shukla, Zongli Lin

2024Chaos An Interdisciplinary Journal of Nonlinear Science13 citationsDOI

Abstract

This work advances the understanding of oscillator Ising machines (OIMs) as a nonlinear dynamic system for solving computationally hard problems. Specifically, we classify the infinite number of all possible equilibrium points of an OIM, including non-0/π ones, into three types based on their structural stability properties. We then employ the stability analysis techniques from control theory to analyze the stability property of all possible equilibrium points and obtain the necessary and sufficient condition for their stability. As a result of these analytical results, we establish, for the first time, the threshold of the binarization in terms of the coupling strength and strength of the second harmonic signal. Furthermore, we provide an estimate of the domain of attraction of each asymptotically stable equilibrium point by employing the Lyapunov stability theory. Finally, we illustrate our theoretical conclusions by numerical simulation.

Topics & Concepts

Stability (learning theory)Equilibrium pointIsing modelHarmonic oscillatorNonlinear systemLyapunov stabilityStability theoryLyapunov functionMathematicsApplied mathematicsDomain (mathematical analysis)Property (philosophy)Computer scienceWork (physics)Coupling (piping)Point (geometry)Statistical physicsControl theory (sociology)Control (management)Mathematical analysisPhysicsArtificial intelligenceQuantum mechanicsMechanical engineeringEngineeringGeometryEpistemologyPhilosophyMachine learningQuantum Computing Algorithms and ArchitectureQuantum many-body systemsNeural Networks and Reservoir Computing