An extension of chaotic probability models to real-valued variables

"Previous works have presented a frequentist interpretation of sets of measures as probabilistic models which have denominated chaotic models. Those models, however, dealt only with sets of probability measures on finite algebras, that is, probability measures which can be related to variables w...

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Detalles Bibliográficos
Autor principal: Fierens, Pablo Ignacio
Formato: Ponencias en Congresos acceptedVersion
Lenguaje:Inglés
Publicado: 2018
Materias:
PROBABILIDAD
MODELOS MATEMATICOS
SIMULACION
Acceso en línea:http://ri.itba.edu.ar/handle/123456789/1348
Aporte de:
Repositorio Institucional Instituto Tecnológico de Buenos Aires (ITBA) de Instituto Tecnológico de Buenos Aires (ITBA)
Descripción
Sumario:"Previous works have presented a frequentist interpretation of sets of measures as probabilistic models which have denominated chaotic models. Those models, however, dealt only with sets of probability measures on finite algebras, that is, probability measures which can be related to variables with a finite number of possible values. In this paper, an extension of chaotic models is proposed in order to deal with the more general case of real-valued variables."

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