Complexity of commuting Hamiltonians on a square lattice of qubits
classification
🪐 quant-ph
keywords
commutingcomplexityhamiltonianscertificateclassicalgroundlatticequbits
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We consider the computational complexity of Hamiltonians which are sums of commuting terms acting on plaquettes in a square lattice of qubits, and we show that deciding whether the ground state minimizes the energy of each local term individually is in the complexity class NP. That is, if the ground states has this property, this can be proven using a classical certificate which can be efficiently verified on a classical computer. Different to previous results on commuting Hamiltonians, our certificate proves the existence of such a state without giving instructions on how to prepare it.
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Forward citations
Cited by 1 Pith paper
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The Complexity of Local Stoquastic Hamiltonians on 2D Lattices
The 2-local stoquastic Hamiltonian problem on 2D square qubit lattices is StoqMA-complete.
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