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Quantum Fourier analysis

Arthur Jaffe, Chunlan Jiang, Zhengwei Liu, Yunxiang Ren, Jinsong Wu

2020Proceedings of the National Academy of Sciences23 citationsDOIOpen Access PDF

Abstract

Significance Classical Fourier analysis, discovered over 200 years ago, remains a cornerstone in understanding almost every field of pure mathematics. Its applications in physics range from classical electromagnetism to the formulation of quantum theory. It gives insights into chemistry, engineering, and information science, and it underlies the theory of communication. Quantum Fourier analysis extends this perspective. It yields insights and inequalities associated with uncertainty principles for quantum symmetries. In this paper, we introduce this mathematical subject, we show how it can solve some theoretical problems, and we give some applications to quantum physics with bounds on entropy and the analysis of quantum entanglement. We believe that quantum Fourier analysis, now in its infancy, will have significant future impact.

Topics & Concepts

Fourier analysisQuantum entanglementFourier transformQuantumTheoretical physicsQuantum information scienceCornerstoneQuantum mechanicsQuantum informationFourier seriesUncertainty principlePhysicsStatistical physicsMathematicsMathematical analysisArtVisual artsAdvanced Operator Algebra ResearchQuantum Mechanics and ApplicationsNoncommutative and Quantum Gravity Theories
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