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On complexity of the quantum Ising model

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arxiv 1410.0703 v1 pith:77U2HN7R submitted 2014-10-02 quant-ph

On complexity of the quantum Ising model

classification quant-ph
keywords hamiltonianscomplexityquantumannealinggroundhamiltoniank-locallocal
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We study complexity of several problems related to the Transverse field Ising Model (TIM). First, we consider the problem of estimating the ground state energy known as the Local Hamiltonian Problem (LHP). It is shown that the LHP for TIM on degree-3 graphs is equivalent modulo polynomial reductions to the LHP for general k-local `stoquastic' Hamiltonians with any constant $k\ge 2$. This result implies that estimating the ground state energy of TIM on degree-3 graphs is a complete problem for the complexity class StoqMA - an extension of the classical class MA. As a corollary, we complete the complexity classification of 2-local Hamiltonians with a fixed set of interactions proposed recently by Cubitt and Montanaro. Secondly, we study quantum annealing algorithms for finding ground states of classical spin Hamiltonians associated with hard optimization problems. We prove that the quantum annealing with TIM Hamiltonians is equivalent modulo polynomial reductions to the quantum annealing with a certain subclass of k-local stoquastic Hamiltonians. This subclass includes all Hamiltonians representable as a sum of a k-local diagonal Hamiltonian and a 2-local stoquastic Hamiltonian.

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Cited by 2 Pith papers

Reviewed papers in the Pith corpus that reference this work. Sorted by Pith novelty score.

  1. The Guided Local Hamiltonian Problem for Stoquastic Hamiltonians

    quant-ph 2025-09 unverdicted novelty 8.0

    The Guided Local Hamiltonian problem for stoquastic Hamiltonians is promise BPP-hard (even 2-local on lattices), BQP-hard under fixed local constraints, and admits a deterministic classical approximation algorithm whe...

  2. The Complexity of Local Stoquastic Hamiltonians on 2D Lattices

    quant-ph 2025-02 unverdicted novelty 5.0

    The 2-local stoquastic Hamiltonian problem on 2D square qubit lattices is StoqMA-complete.