Probabilistic Entropy Measure Derived by using Quadratic Polynomials  and their properties

Surender Kumar; Omdutt Sharma; Naveen Kumar

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Published: Apr 15, 2025

Keywords:

Entropy, fuzzy set, uncertainty measure, quadratic function, information measure

Surender Kumar

Research Scholar, Department of Mathematics, Baba Mast Nath University, Rohtak 124001, India

Omdutt Sharma

Assistant Professor, Department of Mathematics, P.D.M. University, Bahadurgarh 124507, India.

Naveen Kumar

Professor, Department of Mathematics, Baba Mastnath University, Asthal Bohor Rohtak 124021, India

Abstract

First, C. E. Shannon introduced Shannon's entropy, an entropy measure in communication theory. This
measure is logarithmic in nature. In order to quantify information uncertainty, various academics developed new
logarithmic and exponential entropy metrics after Shannon. In this study, a novel probabilistic entropy measure that
efficiently measures complexity and uncertainty in complex systems is proposed using the quadratic equation. These
novel probabilistic entropy Metrics have a big impact on how we understand complicated systems and how we make
decisions in many fields. Several established entropy axioms have been used to verify the validity of the new
probabilistic entropy measure. The findings show that quadratic entropy metrics perform better than current ones in
capturing minute variations in system uncertainty and behavior. In this paper, we discuss some properties of this
measure.

How to Cite

Kumar, S., Sharma, O., & Kumar, N. (2025). Probabilistic Entropy Measure Derived by using Quadratic Polynomials and their properties. International Journal of Advanced Scientific Research and Engineering Trends, 9(4), 98–103. Retrieved from https://journals.mriindia.com/index.php/ijasret/article/view/1773

Issue

Vol. 9 No. 4 (2025): Volume 9 Issue 4 2025

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