Iterative solutions to the steady-state density matrix for optomechanical systems
- Authors
- Nation, P. D.; Johansson, J. R.; Blencowe, M. P.; Rimberg, A. J.
- Issue Date
- 23-1월-2015
- Publisher
- AMER PHYSICAL SOC
- Citation
- PHYSICAL REVIEW E, v.91, no.1
- Indexed
- SCIE
SCOPUS
- Journal Title
- PHYSICAL REVIEW E
- Volume
- 91
- Number
- 1
- URI
- https://scholar.korea.ac.kr/handle/2021.sw.korea/94620
- DOI
- 10.1103/PhysRevE.91.013307
- ISSN
- 1539-3755
- Abstract
- We present a sparse matrix permutation from graph theory that gives stable incomplete lower-upper preconditioners necessary for iterative solutions to the steady-state density matrix for quantum optomechanical systems. This reordering is efficient, adding little overhead to the computation, and results in a marked reduction in both memory and runtime requirements compared to other solution methods, with performance gains increasing with system size. Either of these benchmarks can be tuned via the preconditioner accuracy and solution tolerance. This reordering optimizes the condition number of the approximate inverse and is the only method found to be stable at large Hilbert space dimensions. This allows for steady-state solutions to otherwise intractable quantum optomechanical systems.
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Collections - College of Science > Department of Physics > 1. Journal Articles
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