Controllability of schrödinger equations

薛定谔方程的可控性

• 批准号: 261883-2007
• 负责人: Teismann, Holger
• 金额: $ 1.02万
• 依托单位: Acadia University
• 依托单位国家: 加拿大
• 项目类别: Discovery Grants Program - Individual
• 财政年份: 2010
• 资助国家: 加拿大
• 起止时间: 2010-01-01 至 2011-12-31
• 项目状态: 已结题
• 来源: https://www.nserc-crsng.gc.ca/ase-oro/Details-Detailles_eng.asp?id=456156
• 关键词: Controllability; schr; dinger; equations

In the last few decades, developments in physics, chemistry, and engineering, such as the ever-increasing miniaturization of devices, the emergence of the quantum-computation paradigm, or the desire to influence molecular reactions and to manipulate condensates of ultra-cold atoms (Bose-Einstein condensates), have triggered a growing interest in controlling systems at the quantum scale; i.e., systems that are critically influenced by quantum effects. This research project is aimed at contributing to the theory of the emerging field of "quantum engineering'' by investigating the control properties of the fundamental equation of quantum theory, the Schrödinger equation (and its nonlinear variants). The basic question is whether a given control objective (such as the preparation of an excited or superposition state, the transfer of a Bose-Einstein condensate, or the increase in the yield of a molecular reaction) can be realized by applying suitably designed control fields (usually laser fields) to the system. Although the mathematical control theory for partial differential equations is well developed and many equations arising in physics and engineering have been studied in great detail, the theory for Schrödinger's equation is less complete. This research project is aimed at closing this gap. The results of this research may potentially have implications for areas such as semiconductor technology, nanoscience, or quantum computing.

在过去的几十年中，物理学、化学和工程学的发展，例如设备的不断小型化、量子计算范例的出现，或者影响分子反应和操纵超冷原子的凝聚体（玻色-爱因斯坦凝聚体）的愿望，已经引发了对在量子尺度上控制系统的日益增长的兴趣;即，受到量子效应严重影响的系统。本研究项目旨在通过研究量子理论的基本方程薛定谔方程（及其非线性变体）的控制特性，为新兴领域“量子工程”的理论做出贡献。基本的问题是，给定的控制目标（如激发态或叠加态的制备，玻色-爱因斯坦凝聚态的转移，或分子反应产率的增加）是否可以通过将适当设计的控制场（通常是激光场）应用于系统来实现。虽然偏微分方程的数学控制理论已经发展得很好，许多物理和工程中出现的方程已经被详细研究，但薛定谔方程的理论还不太完整。该研究项目旨在缩小这一差距。这项研究的结果可能对半导体技术、纳米科学或量子计算等领域产生潜在影响。