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Polynomial-time classical simulation of quantum ferromagnets

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arxiv 1612.05602 v1 pith:4RFQJBWC submitted 2016-12-16 quant-ph cond-mat.str-elcs.CC

Polynomial-time classical simulation of quantum ferromagnets

classification quant-ph cond-mat.str-elcs.CC
keywords algorithmmodelclassicalefficientlyenergyerrorfamilyferromagnetic
verification ladder T0 review T1 audit T2 compute T3 formal T4 reserved
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We consider a family of quantum spin systems which includes as special cases the ferromagnetic XY model and ferromagnetic Ising model on any graph, with or without a transverse magnetic field. We prove that the partition function of any model in this family can be efficiently approximated to a given relative error E using a classical randomized algorithm with runtime polynomial in 1/E, system size, and inverse temperature. As a consequence we obtain a polynomial time algorithm which approximates the free energy or ground energy to a given additive error. We first show how to approximate the partition function by the perfect matching sum of a finite graph with positive edge weights. Although the perfect matching sum is not known to be efficiently approximable in general, the graphs obtained by our method have a special structure which facilitates efficient approximation via a randomized algorithm due to Jerrum and Sinclair.

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