McKeague Ian W, Levin Bruce
Department of Biostatistics, Columbia University.
Ann Appl Probab. 2016 Aug;26(4):2540-2555. doi: 10.1214/15-AAP1154. Epub 2016 Sep 1.
From its beginning, there have been attempts by physicists to formulate quantum mechanics without requiring the use of wave functions. An interesting recent approach takes the point of view that quantum effects arise solely from the interaction of finitely many classical "worlds." The wave function is then recovered (as a secondary object) from observations of particles in these worlds, without knowing the world from which any particular observation originates. Hall, Deckert and Wiseman [ X 4 (2014) 041013] have introduced an explicit many-interacting-worlds harmonic oscillator model to provide support for this approach. In this note we provide a proof of their claim that the particle configuration is asymptotically Gaussian, thus matching the stationary ground-state solution of Schrödinger's equation when the number of worlds goes to infinity. We also construct a Markov chain based on resampling from the particle configuration and show that it converges to an Ornstein-Uhlenbeck process, matching the time-dependent solution as well.
从一开始,物理学家们就尝试在不使用波函数的情况下构建量子力学。最近一种有趣的方法认为,量子效应仅源于有限多个经典“世界”的相互作用。然后,在不知道任何特定观测来自哪个世界的情况下,通过对这些世界中粒子的观测(作为次要对象)恢复波函数。霍尔、德克特和怀斯曼[《新物理学杂志》4(2014)041013]引入了一个明确的多相互作用世界谐振子模型来支持这种方法。在本笔记中,我们证明了他们的论断,即当世界数量趋于无穷时,粒子构型渐近为高斯分布,从而与薛定谔方程的稳态基态解相匹配。我们还基于从粒子构型中重新采样构建了一个马尔可夫链,并表明它收敛到一个奥恩斯坦 - 乌伦贝克过程,也与时间相关解相匹配。