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A statistical mechanism for operator growth

Xiangyu Cao

2021Journal of Physics A Mathematical and Theoretical59 citationsDOIOpen Access PDF

Abstract

Abstract It was recently conjectured that in generic quantum many-body systems, the spectral density of local operators has the slowest high-frequency decay as permitted by locality. We show that the infinite-temperature version of this ‘universal operator growth hypothesis’ holds for the quantum Ising spin model in d ⩾ 2 dimensions, and for the chaotic Ising chain (with longitudinal and transverse fields) in one dimension. Moreover, the disordered chaotic Ising chain that exhibits many-body localization can have the same high-frequency spectral density asymptotics as thermalizing models. Our argument is statistical in nature, and is based on the observation that the moments of the spectral density can be written as a sign-problem-free sum over paths of Pauli string operators.

Topics & Concepts

Ising modelOperator (biology)Pauli exclusion principleDimension (graph theory)QuantumStatistical physicsSign (mathematics)ChaoticPhysicsString (physics)Spectrum (functional analysis)MathematicsFermionQuantum mechanicsTheoretical physicsPure mathematicsMathematical analysisComputer scienceChemistryArtificial intelligenceBiochemistryRepressorGeneTranscription factorQuantum many-body systemsOpinion Dynamics and Social InfluenceCold Atom Physics and Bose-Einstein Condensates
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