The Complexity of Stoquastic Local Hamiltonian Problems
摘要
We study the complexity of the Local Hamiltonian Problem (denoted as LH-MIN) in the special case when a Hamiltonian obeys conditions of the Perron-Frobenius theorem: all off-diagonal matrix elements in the standard basis are real and non-positive. We will call such Hamiltonians, which are common in the natural world, stoquastic. An equivalent characterization of stoquastic Hamiltonians is that they have an entry-wise non-negative Gibbs density matrix for any temperature. We prove that LH-MIN for stoquastic Hamiltonians belongs to the complexity class AM -- a probabilistic version of NP with two rounds of communication between the prover and the verifier. We also show that 2-local stoquastic LH-MIN is hard for the class MA. With the additional promise of having a polynomial spectral gap, we show that stoquastic LH-MIN belongs to the class POSTBPP=BPPpath -- a generalization of BPP in which a post-selective readout is allowed. This last result also shows that any problem solved by adiabatic quantum computation using stoquastic Hamiltonians lies in PostBPP.
引用
@article{arxiv.quant-ph/0606140,
title = {The Complexity of Stoquastic Local Hamiltonian Problems},
author = {Sergey Bravyi and David P. DiVincenzo and Roberto I. Oliveira and Barbara M. Terhal},
journal= {arXiv preprint arXiv:quant-ph/0606140},
year = {2009}
}
备注
21 pages Latex, 1 figure. v2 contains several small corrections. v3 has more small corrections