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Matrix Product Density Operators: Renormalization Fixed Points and Boundary Theories

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arxiv 1606.00608 v4 pith:22NYTVBP submitted 2016-06-02 quant-ph cond-mat.str-el

Matrix Product Density Operators: Renormalization Fixed Points and Boundary Theories

classification quant-ph cond-mat.str-el
keywords statesfixedpointsrenormalizationtensorsareaboundarycharacterize
verification ladder T0 review T1 audit T2 compute T3 formal T4 reserved
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We consider the tensors generating matrix product states and density operators in a spin chain. For pure states, we revise the renormalization procedure introduced by F. Verstraete et al. in 2005 and characterize the tensors corresponding to the fixed points. We relate them to the states possessing zero correlation length, saturation of the area law, as well as to those which generate ground states of local and commuting Hamiltonians. For mixed states, we introduce the concept of renormalization fixed points and characterize the corresponding tensors. We also relate them to concepts like finite correlation length, saturation of the area law, as well as to those which generate Gibbs states of local and commuting Hamiltonians. One of the main result of this work is that the resulting fixed points can be associated to the boundary theories of two-dimensional topological states, through the bulk-boundary correspondence introduced by Cirac et al. in 2011.

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