Quantum Trajectories: Dirac, Moyal and Bohm
作者: Basil J. HileyMaurice A. de GossonGlen Dennis
作者单位: 1University College London
2University of Vienna
刊名: Quanta, 2019, Vol.8 (1), pp.11-23
来源数据库: Quanta
DOI: 10.12743/quanta.v8i1.84
原始语种摘要: We recall Dirac's early proposals to develop a description of quantum phenomena in terms of a non-commutative algebra in which he suggested a way to construct what he called quantum trajectories . Generalising these ideas, we show how they are related to weak values and explore their use in the experimental construction of quantum trajectories. We discuss covering spaces which play an essential role in accounting for the wave properties of quantum particles. We briefly point out how new mathematical techniques take us beyond Hilbert space and into a deeper structure which connects with the algebras originally introduced by Born, Heisenberg and Jordan. This enables us to bring out the geometric aspects of quantum phenomena. Quanta 2019; 8: 11–23.
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  • phenomena 现象
  • geometric 凡何
  • covering 覆盖物
  • quantum 量子
  • mathematical 数学的
  • construct 建设
  • point 
  • commutative 可换的
  • description 描述
  • accounting 会计