分数累积残差不准确信息量及其在混沌地图中的应用扩展

Omid Kharazmi, Javier E. Contreras-Reyes
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引用次数: 0

摘要

本文旨在介绍分数累积残差不准确度(FCRI)信息、詹森累积残差不准确度(JCRI)和詹森-分数累积残差不准确度(JFCRI)信息度量。此外,我们还研究了可靠性、经济学和生存分析中使用的一些著名模型的 FCRI 信息。相关结果揭示了 FCRI 信息度量与累积残差熵和基尼均差度量之间的一些有趣联系。本文还介绍了两个混沌离散时间动态系统(切比雪夫系统和逻辑系统)的应用,以说明所提出的信息度量的行为。FCRI 和 JFCRI 测量可根据系统各自的分数和混沌图参数确定系统间的差异区域。
本文章由计算机程序翻译,如有差异,请以英文原文为准。
Fractional Cumulative Residual Inaccuracy Information Measure and Its Extensions with Application to Chaotic Maps
The purpose of this work is to introduce fractional cumulative residual inaccuracy (FCRI) information, Jensen-cumulative residual inaccuracy (JCRI), and Jensen-fractional cumulative residual inaccuracy (JFCRI) information measure. Further, we study the FCRI information for some well-known models used in reliability, economics and survival analysis. The associated results reveal some interesting connections between the FCRI information measure and cumulative residual entropy and Gini mean difference measures. Applications to two chaotic discrete-time dynamical systems (Chebyshev and Logistic) are presented to illustrate the behavior of the proposed information measures. FCRI and JFCRI measures allow to determine regions of discrepancy between systems, depending on their respective fractional and chaotic map parameters.
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