Quantum-inspired search method for low-energy states of classical Ising Hamiltonians

TL;DR

This paper introduces a quantum-inspired numerical method to efficiently find low-energy states of classical Ising Hamiltonians, leveraging infinitesimal quantum interactions and Krylov subspace techniques, applicable to large system sizes.

Contribution

The authors develop a novel quantum-inspired approach that combines infinitesimal quantum interactions with state truncation to solve classical Ising problems more efficiently.

Findings

Successfully applied to systems with up to 600 spins.

Achieves a solution time scaling approximately as N^5.

Provides insights into low-energy state properties of random Ising models.

Abstract

We develop a quantum-inspired numerical procedure for searching low-energy states of a classical Hamiltonian composed of two-body fully-connected random Ising interactions and a random local longitudinal magnetic field. In this method, we introduce infinitesimal quantum interactions that do not commute with the original Ising Hamiltonian, and repeatedly generate and truncate direct product states, inspired by the Krylov subspace method, to obtain the low-energy states of the original classical Ising Hamiltonian. The computational cost is controlled by the form of infinitesimal quantum interactions (e.g., one-body or two-body interactions) and the numbers of infinitesimal interaction terms introduced, different initial states considered, and low-energy states kept during the iteration. For a demonstrate of the method, here we introduce as the infinitesimal quantum interactions pair products of Pauli $X$ operators acting on different sites and on-site Pauli $X$ operators into the random Ising Hamiltonian, in which the numerical cost is $O(N^3)$ per iteration with the system size $N$. We consider 120 instances of the random coupling realizations for the random Ising Hamiltonian with $N$ up to 600 and search the 120 lowest-energy states for each instance. We find that the time-to-solution by the quantum-inspired method proposed here, with parallelization in terms of the different initial states, for searching the ground state of the random Ising Hamiltonian scales approximately as $N^5$ for $N$ up to 600. We also examine the basic physical properties such as the ensemble-averaged ground-state and first-excited energies and the ensemble-averaged number of states in the low-energy region of the random Ising Hamiltonian.