International Journal of Engineering and Management Research (IJEMR)
  • Year: 2018
  • Volume: 8
  • Issue: 2

Strong Consistency and Asymptotic Distribution of Estimator for the Intensity Function Having Form of Periodic Function Multiplied by Power Function Trend of a Poisson Process

1Student, Department of Mathematics, Bogor Agricultural University, Indonesia

2Lecturer, Department of Mathematics, Bogor Agricultural University, Indonesia

*Corresponding Author: ninavalentikamath48@gmail.com

Online published on 16 May, 2018.

Abstract

This manuscript discusses the strong consistency and the asymptotic distribution of an estimator for a periodic component of the intensity function having a form of periodic function multiplied by power function trend of a non-homogeneous Poisson process by using a uniform kernel function. It is assumed that the period of the periodic component of intensity function is known. An estimator for the periodic component using only a single realization of a Poisson process observed at a certain interval has been constructed. This estimator has been proved to be strongly consistent if the length ofthe observationinterval indefinitely expands. Computer simulation also showed the asymptotic normality of this estimator.

Keywords

Asymptotic Distribution, Intensity Function, Power Function Trend, Strong Consistency