Scaling advantage of nonrelaxational dynamics for high-performance combinatorial optimization


Abstract in English

The development of physical simulators, called Ising machines, that sample from low energy states of the Ising Hamiltonian has the potential to drastically transform our ability to understand and control complex systems. However, most of the physical implementations of such machines have been based on a similar concept that is closely related to relaxational dynamics such as in simulated, mean-field, chaotic, and quantum annealing. We show that nonrelaxational dynamics that is associated with broken detailed balance and positive entropy production rate can accelerate the sampling of low energy states compared to that of conventional methods. By implementing such dynamics on field programmable gate array, we show that the nonrelaxational dynamics that we propose, called chaotic amplitude control, exhibits a scaling with problem size of the time to finding optimal solutions and its variance that is significantly smaller than that of relaxational schemes recently implemented on Ising machines.

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