Properties of residuals for spatial point processes

A. Baddeley; Jesper Møller; A. G. Pakes

doi:10.1007/s10463-007-0116-6

Properties of residuals for spatial point processes

A. Baddeley, Jesper Møller, A. G. Pakes

Institut for Matematiske Fag

Publikation: Bidrag til tidsskrift › Tidsskriftartikel › Forskning › peer review

46 Citationer (Scopus)

Abstract

For any point process in R^dthat has a Papangelou conditional intensity λ, we define a random measure of ‘innovations’ which has mean zero. When the point process model parameters are estimated from data, there is an analogous random measure of ‘residuals’. We analyse properties of the innovations and residuals, including first and second moments, conditional independence, a martingale property, and lack of correlation. Some large sample asymptotics are studied. We derive the marginal distribution of smoothed residuals by solving a distributional equivalence.
Udgivelsesdato: SEP

Originalsprog	Engelsk
Tidsskrift	Annals of the Institute of Statistical Mathematics
Vol/bind	60
Udgave nummer	3
Sider (fra-til)	627-649
ISSN	0020-3157
DOI	https://doi.org/10.1007/s10463-007-0116-6
Status	Udgivet - 2008

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T1 - Properties of residuals for spatial point processes

AU - Baddeley, A.

AU - Møller, Jesper

AU - Pakes, A. G.

PY - 2008

Y1 - 2008

N2 - For any point process in Rd that has a Papangelou conditional intensity λ, we define a random measure of ‘innovations' which has mean zero. When the point process model parameters are estimated from data, there is an analogous random measure of ‘residuals'. We analyse properties of the innovations and residuals, including first and second moments, conditional independence, a martingale property, and lack of correlation. Some large sample asymptotics are studied. We derive the marginal distribution of smoothed residuals by solving a distributional equivalence.

AB - For any point process in Rd that has a Papangelou conditional intensity λ, we define a random measure of ‘innovations' which has mean zero. When the point process model parameters are estimated from data, there is an analogous random measure of ‘residuals'. We analyse properties of the innovations and residuals, including first and second moments, conditional independence, a martingale property, and lack of correlation. Some large sample asymptotics are studied. We derive the marginal distribution of smoothed residuals by solving a distributional equivalence.

U2 - 10.1007/s10463-007-0116-6

DO - 10.1007/s10463-007-0116-6

M3 - Journal article

SN - 0020-3157

VL - 60

SP - 627

EP - 649

JO - Annals of the Institute of Statistical Mathematics

JF - Annals of the Institute of Statistical Mathematics

IS - 3

ER -

Properties of residuals for spatial point processes

Abstract

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