手性酉和分步量子行走的指标理论

IF 0.9 3区 物理与天体物理 Q2 MATHEMATICS Symmetry Integrability and Geometry-Methods and Applications Pub Date : 2022-11-19 DOI:10.3842/SIGMA.2023.053
C. Bourne
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引用次数: 1

摘要

基于Cedzich et al.和Suzuki et al.的工作,我们考虑手性酉的拓扑和指标论性质,手性酉是手性对称自伴随算子的时间演化的抽象。分步量子行走提供了一类丰富的例子。在Hilbert空间和Hilbert $C^*$-模上,我们使用一对投影的指标和Cayley变换来定义手性酉的拓扑指标。对于类哈密顿算子的离散时间演化,我们将手性酉元的指标与哈密顿算子的指标联系起来。我们也证明了Hilbert $C^*$-模上各向异性分步量子行走的一个双面圈数公式,推广了Matsuzawa的结果。
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Index Theory of Chiral Unitaries and Split-Step Quantum Walks
Building from work by Cedzich et al. and Suzuki et al., we consider topological and index-theoretic properties of chiral unitaries, which are an abstraction of the time evolution of a chiral-symmetric self-adjoint operator. Split-step quantum walks provide a rich class of examples. We use the index of a pair of projections and the Cayley transform to define topological indices for chiral unitaries on both Hilbert spaces and Hilbert $C^*$-modules. In the case of the discrete time evolution of a Hamiltonian-like operator, we relate the index for chiral unitaries to the index of the Hamiltonian. We also prove a double-sided winding number formula for anisotropic split-step quantum walks on Hilbert $C^*$-modules, extending a result by Matsuzawa.
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来源期刊
CiteScore
1.80
自引率
0.00%
发文量
87
审稿时长
4-8 weeks
期刊介绍: Scope Geometrical methods in mathematical physics Lie theory and differential equations Classical and quantum integrable systems Algebraic methods in dynamical systems and chaos Exactly and quasi-exactly solvable models Lie groups and algebras, representation theory Orthogonal polynomials and special functions Integrable probability and stochastic processes Quantum algebras, quantum groups and their representations Symplectic, Poisson and noncommutative geometry Algebraic geometry and its applications Quantum field theories and string/gauge theories Statistical physics and condensed matter physics Quantum gravity and cosmology.
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