Symmetry (Mar 2023)

Kernel Estimation of the Extropy Function under <i>α</i>-Mixing Dependent Data

  • Radhakumari Maya,
  • Muhammed Rasheed Irshad,
  • Hassan Bakouch,
  • Archana Krishnakumar,
  • Najla Qarmalah

DOI
https://doi.org/10.3390/sym15040796
Journal volume & issue
Vol. 15, no. 4
p. 796

Abstract

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Shannon developed the idea of entropy in 1948, which relates to the measure of uncertainty associated with a random variable X. The contribution of the extropy function as a dual complement of entropy is one of the key modern results based on Shannon’s work. In order to develop the inferential aspects of the extropy function, this paper proposes a non-parametric kernel type estimator as a new method of measuring uncertainty. Here, the observations are exhibiting α-mixing dependence. Asymptotic properties of the estimator are proved under appropriate regularity conditions. For comparison’s sake, a simple non-parametric estimator is proposed, and in this respect, the performance of the estimator is investigated using a Monte Carlo simulation study based on mean-squared error and using two real-life data.

Keywords