Plithogenic Probability & Statistics are generalizations of MultiVariate Probability & Statistics

Authors

  • Florentin Smarandache

Abstract

In this paper we exemplify the types of Plithogenic Probability and respectively Plithogenic
Statistics. Several applications are given.
The Plithogenic Probability of an event to occur is composed from the chances that the event occurs
with respect to all random variables (parameters) that determine it. Each such a variable is described
by a Probability Distribution (Density) Function, which may be a classical, (T,I,F)-neutrosophic,
I-neutrosophic, (T,F)-intuitionistic fuzzy, (T,N,F)-picture fuzzy, (T,N,F)-spherical fuzzy, or (other
fuzzy extension) distribution function.
The Plithogenic Probability is a generalization of the classical MultiVariate Probability.
The analysis of the events described by the plithogenic probability is the Plithogenic Statistics

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Published

2021-07-09

Issue

Vol. 43 (2021): Neutrosophic Sets and Systems

Section

SI#1,2024: Neutrosophical Advancements And Their Impact on Research

License

Copyright (c) 2024 Neutrosophic Sets and Systems

Creative Commons License

This work is licensed under a Creative Commons Attribution-NonCommercial-ShareAlike 4.0 International License.

 Creative Commons Attribution (CC BY) license.

How to Cite

Florentin Smarandache. (2021). Plithogenic Probability & Statistics are generalizations of MultiVariate Probability & Statistics. Neutrosophic Sets and Systems, 43, 280-289. https://fs.unm.edu/nss8/index.php/111/article/view/4099

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