On Some Estimation Methods of Neutrosophic Continuous Probability Distributions Using One-Dimensional AH-Isometry
Keywords:
AH Isometry; Neutrosophic Field of Reals; Maximum Likelihood; Moments; Probability Density Functions; Neutrosophic Fisher Information.Abstract
In this research, we introduce an algebraic approach to define the concept of neutrosophic
maximum likelihood estimation method based on neutrosophic continuous probability
distributions based on classical neutrosophic numbers of the form ð‘ = ð‘Ž + ð‘ð¼;ð¼
2 = ð¼ i.e., ð¼ is a
letter not a numerical set. We prove that the neutrosophic loglikelihood function gives the same
estimators given by neutrosophic likelihood function. Also, we present the concept of neutrosophic
moments estimation method which produces system of neutrosophic equations to derive the
neutrosophic estimators using an algebraic isomorphism. Estimators based on two mentioned
methods were derived successfully for some neutrosophic continuous probability distributions.
Concept of neutrosophic Fisher information is also presented. Theorems were proved using an
algebraic approach depending on the one-dimensional AH-Isometry. A simulation study is also
presented to show the efficiency of the presented estimators.
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