Commuting Local Hamiltonians Beyond 2D

TL;DR

This paper introduces a new technique called guided reductions to analyze the complexity of commuting local Hamiltonians, showing that certain 2D and 3D families with rank-1 terms are in NP, expanding understanding beyond previous geometric restrictions.

Contribution

The authors develop a flexible rounding technique using Jordan's Lemma and the Structure Lemma, enabling larger classes of commuting local Hamiltonians to be shown in NP.

Findings

2D rank-1 commuting Hamiltonians are in NP regardless of local dimension.

3D rank-1 commuting Hamiltonians with qudits on edges are in NP.

New guided reduction technique generalizes previous methods.

Abstract

Commuting local Hamiltonians provide a testing ground for studying many of the most interesting open questions in quantum information theory, including the quantum PCP conjecture and the existence of area laws. Although they are a simplified model of quantum computation, the status of the commuting local Hamiltonian problem remains largely unknown. A number of works have shown that increasingly expressive families of commuting local Hamiltonians admit completely classical verifiers. Despite intense work, the largest class of commuting local Hamiltonians we can place in NP are those on a square lattice, where each lattice site is a qutrit. Even worse, many of the techniques used to analyze these problems rely heavily on the geometry of the square lattice and the properties of the numbers 2 and 3 as local dimensions. In this work, we present a new technique to analyze the complexity of various families of commuting local Hamiltonians: guided reductions. Intuitively, these are a generalization of typical reduction where the prover provides a guide so that the verifier can construct a simpler Hamiltonian. The core of our reduction is a new rounding technique based on a combination of Jordan's Lemma and the Structure Lemma. Our rounding technique is much more flexible than previous work, and allows us to show that a larger family of commuting local Hamiltonians is in NP, albiet with the restriction that all terms are rank-1. Specifically, we prove the following two results: 1. Commuting local Hamiltonians in 2D that are rank-1 are contained in NP, independent of the qudit dimension. Note that this family of commuting local Hamiltonians has no restriction on the local dimension or the locality. 2. We prove that rank-1, 3D commuting Hamiltonians with qudits on edges are in NP. To our knowledge this is the first time a family of 3D commuting local Hamiltonians has been contained in NP.