非周期图
双稳态
随机共振
最大值和最小值
噪音(视频)
参数空间
控制理论(社会学)
计算机科学
转化(遗传学)
共振(粒子物理)
数学
物理
光电子学
人工智能
化学
生物化学
粒子物理学
统计
控制(管理)
组合数学
数学分析
基因
图像(数学)
作者
Bohou Xu,Fabing Duan,François Chapeau‐Blondeau
出处
期刊:Physical Review E
[American Physical Society]
日期:2004-06-23
卷期号:69 (6): 061110-061110
被引量:75
标识
DOI:10.1103/physreve.69.061110
摘要
Two methods of realizing aperiodic stochastic resonance (ASR) by adding noise and tuning system parameters in a bistable system, after a scale transformation, can be compared in a real parameter space. In this space, the resonance point of ASR via adding noise denotes the extremum of a line segment, whereas the method of tuning system parameters presents the extrema of a parameter plane. We demonstrate that, in terms of the system performance, the method of tuning system parameters takes the precedence of the approach of adding noise for an adjustable bistable system. Besides, adding noise can be viewed as a specific case of tuning system parameters. Further research shows that the optimal system found by tuning system parameters may be subthreshold or suprathreshold, and the conventional ASR effects might not occur in some suprathreshold optimal systems.
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