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Projected Entangled Pair States: Fundamental Analytical and Numerical Limitations

G. Scarpa, Akos Molnar, Yimin Ge, Juan José García‐Ripoll, Norbert Schuch, David Pérez-Garcı́a, S. Iblisdir

2020Physical Review Letters26 citationsDOIOpen Access PDF

Abstract

Matrix product states and projected entangled pair states (PEPS) are powerful analytical and numerical tools to assess quantum many-body systems in one and higher dimensions, respectively. While matrix product states are comprehensively understood, in PEPS fundamental questions, relevant analytically as well as numerically, remain open, such as how to encode symmetries in full generality, or how to stabilize numerical methods using canonical forms. Here, we show that these key problems, as well as a number of related questions, are algorithmically undecidable, that is, they cannot be fully resolved in a systematic way. Our work thereby exposes fundamental limitations to a full and unbiased understanding of quantum many-body systems using PEPS.

Topics & Concepts

GeneralityStatistical physicsQuantumComputer scienceProduct (mathematics)Undecidable problemENCODEMatrix multiplicationPhysicsMatrix (chemical analysis)Theoretical physicsQuantum mechanicsTheoretical computer scienceMathematicsBiochemistryDecidabilityPsychologyGeometryComposite materialPsychotherapistChemistryGeneMaterials scienceQuantum many-body systemsQuantum and electron transport phenomenaPhysics of Superconductivity and Magnetism