Test for Uniformity of Exchangeable Random Variables on the Circle

Seonghun Cho; Young Geun Choi; Johan Lim; Won Jun Lee; Hyun Jeong Bai; Sungwon Kwon

doi:10.1007/s42952-020-00092-3

Test for Uniformity of Exchangeable Random Variables on the Circle

Seonghun Cho, Young Geun Choi, Johan Lim, Won Jun Lee, Hyun Jeong Bai, Sungwon Kwon

Research output: Contribution to journal › Article › peer-review

1 Scopus citations

Abstract

We are motivated by our laboratory experiment on the flocking behavior of termites. To test for the existence of flocking behavior, we revisit the problem to test uniform samples (with the samples uniformly distributed) on the circle. Unlike most existing works, we assume that the samples are exchangeably dependent. We consider the class of normalized infinitely divisible distributions for the spacings of the samples, which form uniform samples on the circle. To test the uniformity, we study a test (Kuiper’s test) based on spacings of the samples and compute the asymptotic null distribution of the test statistic as the scaled Kolmogorov distribution. We apply the procedure to our experimental data and justify the flocking behavior of termites.

Original language	English
Pages (from-to)	615-630
Number of pages	16
Journal	Journal of the Korean Statistical Society
Volume	50
Issue number	2
DOIs	https://doi.org/10.1007/s42952-020-00092-3
State	Published - Jun 2021
Externally published	Yes

Keywords

Exchangeability
Flocking behavior
Kuiper’s test
Normalized infinitely divisible distribution
Termite
Uniformity on the circle

Access to Document

10.1007/s42952-020-00092-3

Cite this

@article{80090f3f425e45bd899fde401c301e7e,

title = "Test for Uniformity of Exchangeable Random Variables on the Circle",

abstract = "We are motivated by our laboratory experiment on the flocking behavior of termites. To test for the existence of flocking behavior, we revisit the problem to test uniform samples (with the samples uniformly distributed) on the circle. Unlike most existing works, we assume that the samples are exchangeably dependent. We consider the class of normalized infinitely divisible distributions for the spacings of the samples, which form uniform samples on the circle. To test the uniformity, we study a test (Kuiper{\textquoteright}s test) based on spacings of the samples and compute the asymptotic null distribution of the test statistic as the scaled Kolmogorov distribution. We apply the procedure to our experimental data and justify the flocking behavior of termites.",

keywords = "Exchangeability, Flocking behavior, Kuiper{\textquoteright}s test, Normalized infinitely divisible distribution, Termite, Uniformity on the circle",

author = "Seonghun Cho and Choi, \{Young Geun\} and Johan Lim and Lee, \{Won Jun\} and Bai, \{Hyun Jeong\} and Sungwon Kwon",

note = "Publisher Copyright: {\textcopyright} 2020, Korean Statistical Society.",

year = "2021",

month = jun,

doi = "10.1007/s42952-020-00092-3",

language = "English",

volume = "50",

pages = "615--630",

journal = "Journal of the Korean Statistical Society",

issn = "1226-3192",

publisher = "Korean Statistical Society",

number = "2",

}

TY - JOUR

T1 - Test for Uniformity of Exchangeable Random Variables on the Circle

AU - Cho, Seonghun

AU - Choi, Young Geun

AU - Lim, Johan

AU - Lee, Won Jun

AU - Bai, Hyun Jeong

AU - Kwon, Sungwon

PY - 2021/6

Y1 - 2021/6

N2 - We are motivated by our laboratory experiment on the flocking behavior of termites. To test for the existence of flocking behavior, we revisit the problem to test uniform samples (with the samples uniformly distributed) on the circle. Unlike most existing works, we assume that the samples are exchangeably dependent. We consider the class of normalized infinitely divisible distributions for the spacings of the samples, which form uniform samples on the circle. To test the uniformity, we study a test (Kuiper’s test) based on spacings of the samples and compute the asymptotic null distribution of the test statistic as the scaled Kolmogorov distribution. We apply the procedure to our experimental data and justify the flocking behavior of termites.

AB - We are motivated by our laboratory experiment on the flocking behavior of termites. To test for the existence of flocking behavior, we revisit the problem to test uniform samples (with the samples uniformly distributed) on the circle. Unlike most existing works, we assume that the samples are exchangeably dependent. We consider the class of normalized infinitely divisible distributions for the spacings of the samples, which form uniform samples on the circle. To test the uniformity, we study a test (Kuiper’s test) based on spacings of the samples and compute the asymptotic null distribution of the test statistic as the scaled Kolmogorov distribution. We apply the procedure to our experimental data and justify the flocking behavior of termites.

KW - Exchangeability

KW - Flocking behavior

KW - Kuiper’s test

KW - Normalized infinitely divisible distribution

KW - Termite

KW - Uniformity on the circle

UR - https://www.scopus.com/pages/publications/85096572225

U2 - 10.1007/s42952-020-00092-3

DO - 10.1007/s42952-020-00092-3

M3 - Article

AN - SCOPUS:85096572225

SN - 1226-3192

VL - 50

SP - 615

EP - 630

JO - Journal of the Korean Statistical Society

JF - Journal of the Korean Statistical Society

IS - 2

ER -

Test for Uniformity of Exchangeable Random Variables on the Circle

Abstract

Keywords

Access to Document

Other files and links

Fingerprint

Cite this