MILANG Journal of Mathematics and Its Applications
Vol. 6 No. 2 (2007): Journal of Mathematics and Its Applications

CONSISTENCY OF KERNEL-TYPE ESTIMATORS FOR THE FIRST AND SECOND DERIVATIVES OF A PERIODIC POISSON INTENSITY FUNCTION

MANGKU, I W. (Unknown)
SYAMSURI, S. (Unknown)
HERNIWAT, H. (Unknown)

Article Info

Publish Date
01 Dec 2007

Abstract

We construct and investigate consistent kernel-type estimators for the first and second derivatives of a periodic Poisson intensity function when the period is known. We do not assume any particular parametric form for the intensity function. More- over, we consider the situation when only a single realization of the Poisson process is available, and only observed in a bounded interval. We prove that the proposed estimators are consistent when the length of the interval goes to infinity. We also prove that the mean-squared error of the estimators converge to zero when the length of the interval goes to infinity.1991 Mathematics Subject Classification: 60G55, 62G05, 62G20.

Copyrights © 2007




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Journal Info
MILANG Journal of Mathematics and Its Applications
Website

Abbrev

jmap

Publisher

Institut Pertanian Bogor

Subject

Mathematics

Description

MILANG Journal of Mathematics and Its Applications, originally established in 2002 as the Journal of Mathematics and Its Applications (ISSN 1412-677X), transitioned to online publishing in 2018 and was renamed in 2022 to reflect its broadened scope. The name MILANG, a Sundanese word meaning “to ...