The Complexity of Stoquastic Sparse Hamiltonians

Abstract

Despite having an unnatural definition, StoqMA plays a central role in Hamiltonian complexity, e.g., in the classification theorem of the complexity of Hamiltonians by Cubitt and Montanaro (SICOMP 2016). Moreover, it lies between the two randomized extensions of NP, MA and AM. Therefore, understanding the exact power of StoqMA (and hopefully collapsing it with more natural complexity classes) is of great interest for different reasons. In this work, we take a step further in understanding this complexity class by showing that the Stoquastic Sparse Hamiltonians problem (StoqSH) is in StoqMA. Since Stoquastic Local Hamiltonians are StoqMA-hard, this implies that StoqSH is StoqMA-complete. We complement this result by showing that the separable version of StoqSH is StoqMA(2)-complete, where StoqMA(2) is the version of StoqMA that receives two unentangled proofs.