Statistical aspects of fuzzy monotone set-valued stochastic processes. Application to birth-and-growth processes

Giacomo Aletti; Enea G. Bongiorno; Vincenzo Capasso

doi:10.1016/j.fss.2008.12.011

Statistical aspects of fuzzy monotone set-valued stochastic processes. Application to birth-and-growth processes

Giacomo Aletti
, Enea G. Bongiorno
, Vincenzo Capasso

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

Abstract

The paper considers a particular family of fuzzy monotone set-valued stochastic processes. The proposed setting allows us to investigate suitable α-level sets of such processes, modeling birth-and-growth processes. A decomposition theorem is established to characterize the nucleation and the growth. As a consequence, different consistent set-valued estimators are studied for growth process. Moreover, the nucleation process is studied via the hitting function, and a consistent estimator of the nucleation hitting function is derived.

Original language	English
Pages (from-to)	3140-3151
Number of pages	12
Journal	Fuzzy Sets and Systems
Volume	160
Issue number	21
DOIs	https://doi.org/10.1016/j.fss.2008.12.011
Publication status	Published - 1 Nov 2009
Externally published	Yes

Keywords

Birth-and-growth processes
Fuzzy random sets
Non-additive measures
Random closed sets
Set-valued processes
Stochastic geometry

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10.1016/j.fss.2008.12.011

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title = "Statistical aspects of fuzzy monotone set-valued stochastic processes. Application to birth-and-growth processes",

abstract = "The paper considers a particular family of fuzzy monotone set-valued stochastic processes. The proposed setting allows us to investigate suitable α-level sets of such processes, modeling birth-and-growth processes. A decomposition theorem is established to characterize the nucleation and the growth. As a consequence, different consistent set-valued estimators are studied for growth process. Moreover, the nucleation process is studied via the hitting function, and a consistent estimator of the nucleation hitting function is derived.",

keywords = "Birth-and-growth processes, Fuzzy random sets, Non-additive measures, Random closed sets, Set-valued processes, Stochastic geometry",

author = "Giacomo Aletti and Bongiorno, \{Enea G.\} and Vincenzo Capasso",

year = "2009",

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doi = "10.1016/j.fss.2008.12.011",

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T1 - Statistical aspects of fuzzy monotone set-valued stochastic processes. Application to birth-and-growth processes

AU - Aletti, Giacomo

AU - Bongiorno, Enea G.

AU - Capasso, Vincenzo

PY - 2009/11/1

Y1 - 2009/11/1

N2 - The paper considers a particular family of fuzzy monotone set-valued stochastic processes. The proposed setting allows us to investigate suitable α-level sets of such processes, modeling birth-and-growth processes. A decomposition theorem is established to characterize the nucleation and the growth. As a consequence, different consistent set-valued estimators are studied for growth process. Moreover, the nucleation process is studied via the hitting function, and a consistent estimator of the nucleation hitting function is derived.

AB - The paper considers a particular family of fuzzy monotone set-valued stochastic processes. The proposed setting allows us to investigate suitable α-level sets of such processes, modeling birth-and-growth processes. A decomposition theorem is established to characterize the nucleation and the growth. As a consequence, different consistent set-valued estimators are studied for growth process. Moreover, the nucleation process is studied via the hitting function, and a consistent estimator of the nucleation hitting function is derived.

KW - Birth-and-growth processes

KW - Fuzzy random sets

KW - Non-additive measures

KW - Random closed sets

KW - Set-valued processes

KW - Stochastic geometry

UR - https://www.scopus.com/pages/publications/69249223172

U2 - 10.1016/j.fss.2008.12.011

DO - 10.1016/j.fss.2008.12.011

M3 - Article

SN - 0165-0114

VL - 160

SP - 3140

EP - 3151

JO - Fuzzy Sets and Systems

JF - Fuzzy Sets and Systems

IS - 21

ER -

Statistical aspects of fuzzy monotone set-valued stochastic processes. Application to birth-and-growth processes

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Keywords

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