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Geometric Operator Quantum Speed Limit, Wegner Hamiltonian Flow and Operator Growth

Niklas Hörnedal, Nicoletta Carabba, Kazutaka Takahashi, Adolfo del Campo

2023Quantum36 citationsDOIOpen Access PDF

Abstract

Quantum speed limits (QSLs) provide lower bounds on the minimum time required for a process to unfold by using a distance between quantum states and identifying the speed of evolution or an upper bound to it. We introduce a generalization of QSL to characterize the evolution of a general operator when conjugated by a unitary. The resulting operator QSL (OQSL) admits a geometric interpretation, is shown to be tight, and holds for operator flows induced by arbitrary unitaries, i.e., with time- or parameter-dependent generators. The derived OQSL is applied to the Wegner flow equations in Hamiltonian renormalization group theory and the operator growth quantified by the Krylov complexity.

Topics & Concepts

Hamiltonian (control theory)Displacement operatorOperator (biology)MathematicsUnitary operatorUnitary stateQuantumFlow (mathematics)Ladder operatorMathematical physicsQuantum mechanicsMathematical analysisPure mathematicsPhysicsFinite-rank operatorCompact operatorComputer scienceQuasinormal operatorGeometryHilbert spaceMathematical optimizationBanach spaceBiochemistryGeneLawProgramming languagePolitical scienceTranscription factorChemistryRepressorExtension (predicate logic)Quantum many-body systemsQuantum Information and CryptographyQuantum Mechanics and Applications
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