One-dimensional quantum walks with absorbing boundaries
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摘要
In this paper we analyze the behavior of quantum random walks. In particular, we present several new results for the absorption probabilities in systems with both one and two absorbing walls for the one-dimensional case. We compute these probabilities both by employing generating functions and by use of an eigenfunction approach. The generating function method is used to determine some simple properties of the walks we consider, but appears to have limitations. The eigenfunction approach works by relating the problem of absorption to a unitary problem that has identical dynamics inside a certain domain, and can be used to compute several additional interesting properties, such as the time dependence of absorption. The eigenfunction method has the distinct advantage that it can be extended to arbitrary dimensionality. We outline the solution of the absorption probability problem of a (D−1)-dimensional wall in a D-dimensional space.
论文关键词:03.67.Lx,Quantum walks,Quantum random walks,Discrete quantum processes,Quantum computation
论文评审过程:Received 28 August 2002, Revised 15 March 2003, Available online 4 June 2004.
论文官网地址:https://doi.org/10.1016/j.jcss.2004.03.005