A tensor approach to higher order expectations of quantized chaotictrajectories. I. General theory and specialization to piecewise affineMarkov systems

Rovatti R.; Mazzini G.; Setti G.

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A tensor approach to higher order expectations of quantized chaotictrajectories. I. General theory and specialization to piecewise affineMarkov systems

机译：一种张量方法，用于量化混沌轨迹的更高阶期望。一，一般理论和分段仿射马尔可夫系统的专业化

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The problem of computing any-order expectations of trajectories generated by discrete-time one-dimensional chaotic systems is addressed by means of a suitable generalization of the Perron-Frobenius operator and its quantization. Tools from tensor algebra are introduced and analytical expressions for the special case of piecewise-affine Markov maps are obtained. Results are further specialized for a family of maps with quite general features. As an example application, some cross- and self-interference terms are computed, which are involved in the evaluation of the performance of chaos-based DS-CDMA systems in an asynchronous multipath environment

机译：通过适当地对Perron-Frobenius算子及其量化，可以解决计算离散时间一维混沌系统生成的轨迹的任意阶期望的问题。介绍了来自张量代数的工具，并获得了分段仿射Markov映射特殊情况的解析表达式。结果进一步针对具有相当普遍特征的地图族。作为示例应用程序，计算了一些干扰项和自干扰项，这些项涉及异步多径环境中基于混沌的DS-CDMA系统的性能评估。

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《IEEE Transactions on Circuits and Systems. I, Regular Papers》 |2000年第11期|p.1571-1583|共13页
作者
Rovatti R.; Mazzini G.; Setti G.;
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正文语种 eng
中图分类 TN71;
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Markov processes; chaos; code division multiple access; correlation theory; multipath channels; radiofrequency interference; spread spectrum communication; tensors; Perron-Frobenius operator; asynchronous multipath environment; chaos-based DS-CDMA systems; cross-in;

机译：马尔可夫过程;混沌;码分多址;相关理论;多径信道;射频干扰;扩频通信;张量;Perron-Frobenius算子;异步多径环境;基于混沌的DS-CDMA系统;交叉输入;
入库时间 2022-08-17 23:40:24

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1. A tensor approach to higher order expectations of quantized chaotic trajectories. I. General theory and specialization to piecewise affine Markov systems [J] . Rovatti R., Mazzini G. IEEE Transactions on Circuits and Systems. 1 . 2000,第11期

机译：一种张量方法，用于量化混沌轨迹的更高阶期望。一，一般理论和分段仿射马尔可夫系统的专业化
2. Tensor function analysis of quantized chaotic piecewise-affinepseudo-Markov systems. I. Second-order correlations and self similarity [J] . Rovatti R., Mazzini G. IEEE Transactions on Circuits and Systems. I, Regular Papers . 2002,第2期

机译：量化混沌分段-affinepseudo-Markov系统的张量函数分析。一，二阶相关和自相似
3. Tensor-Based Theory for Quantized Piecewise-Affine Markov Systems: analysis of Some Map Families [J] . Gianluca SETTI, Riccardo Rovatti, Gianluca Mazzini IEICE Transactions on Fundamentals of Electronics, Communications and Computer Sciences . 2001,第9期

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7. Perturbation theory in radial quantization approach and the expectation values of exponential fields in sine-Gordon model [O] . Mkhitaryan, V V, Poghossian, R H, Sedrakian, T A 1999

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8. Piecewise Quadratic Strength Tensor Theory for Composites [R] . Tang, P. Y. 1987

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A tensor approach to higher order expectations of quantized chaotictrajectories. I. General theory and specialization to piecewise affineMarkov systems

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