Building new probability distributions: the composition method and a computer based method
| Autor(a) principal: | |
|---|---|
| Data de Publicação: | 2017 |
| Tipo de documento: | Tese |
| Idioma: | eng |
| Título da fonte: | Repositório Institucional da UFPE |
| dARK ID: | ark:/64986/001300000grn9 |
| Texto Completo: | https://repositorio.ufpe.br/handle/123456789/24966 |
Resumo: | We discuss the creation of new probability distributions for continuous data in two distinct approaches. The first one is, to our knowledge, novelty and consists of using Estimation of Distribution Algorithms (EDAs) to obtain new cumulative distribution functions. This class of algorithms work as follows. A population of solutions for a given problem is randomly selected from a space of candidates, which may contain candidates that are not feasible solutions to the problem. The selection occurs by following a set of probability rules that, initially, assign a uniform distribution to the space of candidates. Each individual is ranked by a fitness criterion. A fraction of the most fit individuals is selected and the probability rules are then adjusted to increase the likelihood of obtaining solutions similar to the most fit in the current population. The algorithm iterates until the set of probability rules are able to provide good solutions to the problem. In our proposal, the algorithm is used to generate cumulative distribution functions to model a given continuous data set. We tried to keep the mathematical expressions of the new functions as simple as possible. The results were satisfactory. We compared the models provided by the algorithm to the ones in already published papers. In every situation, the models proposed by the algorithms had advantages over the ones already published. The main advantage is the relative simplicity of the mathematical expressions obtained. Still in the context of computational tools and algorithms, we show the performance of simple neural networks as a method for parameter estimation in probability distributions. The motivation for this was the need to solve a large number of non linear equations when dealing with SAR images (SAR stands for synthetic aperture radar) in the statistical treatment of such images. The estimation process requires solving, iteratively, a non-linear equation. This is repeated for every pixel and an image usually consists of a large number of pixels. We trained a neural network to approximate an estimator for the parameter of interest. Once trained, the network can be fed the data and it will return an estimate of the parameter of interest without the need of iterative methods. The training of the network can take place even before collecting the data from the radar. The method was tested on simulated and real data sets with satisfactory results. The same method can be applied to different distributions. The second part of this thesis shows two new probability distribution classes obtained from the composition of already existing ones. In each situation, we present the new class and general results such as power series expansions for the probability density functions, expressions for the moments, entropy and alike. The first class is obtained from the composition of the beta-G and Lehmann-type II classes. The second class, from the transmuted-G and Marshall-Olkin-G classes. Distributions in these classes are compared to already existing ones as a way to illustrate the performance of applications to real data sets. |
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PINHO, Luis Gustavo Bastoshttp://lattes.cnpq.br/7587599315362185http://lattes.cnpq.br/3268732497595112CORDEIRO, Gauss MoutinhoNOBRE, Juvêncio Santos2018-07-03T21:14:00Z2018-07-03T21:14:00Z2017-01-17https://repositorio.ufpe.br/handle/123456789/24966ark:/64986/001300000grn9We discuss the creation of new probability distributions for continuous data in two distinct approaches. The first one is, to our knowledge, novelty and consists of using Estimation of Distribution Algorithms (EDAs) to obtain new cumulative distribution functions. This class of algorithms work as follows. A population of solutions for a given problem is randomly selected from a space of candidates, which may contain candidates that are not feasible solutions to the problem. The selection occurs by following a set of probability rules that, initially, assign a uniform distribution to the space of candidates. Each individual is ranked by a fitness criterion. A fraction of the most fit individuals is selected and the probability rules are then adjusted to increase the likelihood of obtaining solutions similar to the most fit in the current population. The algorithm iterates until the set of probability rules are able to provide good solutions to the problem. In our proposal, the algorithm is used to generate cumulative distribution functions to model a given continuous data set. We tried to keep the mathematical expressions of the new functions as simple as possible. The results were satisfactory. We compared the models provided by the algorithm to the ones in already published papers. In every situation, the models proposed by the algorithms had advantages over the ones already published. The main advantage is the relative simplicity of the mathematical expressions obtained. Still in the context of computational tools and algorithms, we show the performance of simple neural networks as a method for parameter estimation in probability distributions. The motivation for this was the need to solve a large number of non linear equations when dealing with SAR images (SAR stands for synthetic aperture radar) in the statistical treatment of such images. The estimation process requires solving, iteratively, a non-linear equation. This is repeated for every pixel and an image usually consists of a large number of pixels. We trained a neural network to approximate an estimator for the parameter of interest. Once trained, the network can be fed the data and it will return an estimate of the parameter of interest without the need of iterative methods. The training of the network can take place even before collecting the data from the radar. The method was tested on simulated and real data sets with satisfactory results. The same method can be applied to different distributions. The second part of this thesis shows two new probability distribution classes obtained from the composition of already existing ones. In each situation, we present the new class and general results such as power series expansions for the probability density functions, expressions for the moments, entropy and alike. The first class is obtained from the composition of the beta-G and Lehmann-type II classes. The second class, from the transmuted-G and Marshall-Olkin-G classes. Distributions in these classes are compared to already existing ones as a way to illustrate the performance of applications to real data sets.FACEPEDiscutimos a criação de novas distribuições de probabilidade para dados contínuos em duas abordagens distintas. A primeira é, ao nosso conhecimento, inédita e consiste em utilizar algoritmos de estimação de distribuição para a obtenção de novas funções de distribuição acumulada. Algoritmos de estimação de distribuição funcionam da seguinte forma. Uma população de soluções para um determinado problema é extraída aleatoriamente de um conjunto que denominamos espaço de candidatos, o qual pode possuir candidatos que não são soluções viáveis para o problema. A extração ocorre de acordo com um conjunto de regras de probabilidade, as quais inicialmente atribuem uma distribuição uniforme ao espaço de candidatos. Cada indivíduo na população é classificado de acordo com um critério de desempenho. Uma porção dos indivíduos com melhor desempenho é escolhida e o conjunto de regras é adaptado para aumentar a probabilidade de obter soluções similares aos melhores indivíduos da população atual. O processo é repetido por um número de gerações até que a distribuição de probabilidade das soluções sorteadas forneça soluções boas o suficiente. Em nossa aplicação, o problema consiste em obter uma função de distribuição acumulada para um conjunto de dados contínuos qualquer. Tentamos, durante o processo, manter as expressões matemáticas das distribuições geradas as mais simples possíveis. Os resultados foram satisfatórios. Comparamos os modelos providos pelo algoritmo a modelos publicados em outros artigos. Em todas as situações, os modelos obtidos pelo algoritmo apresentaram vantagens sobre os modelos dos artigos publicados. A principal vantagem é a expressão matemática reduzida. Ainda no contexto do uso de ferramentas computacionais e algoritmos, mostramos como utilizar redes neurais simples para a estimação de parâmetros em distribuições de probabilidade. A motivação para tal aplicação foi a necessidade de resolver iterativamente um grande número de equações não lineares no tratamento estatístico de imagens obtidas de SARs (synthetic aperture radar). O processo de estimação requer a solução de uma equação por métodos iterativos e isso é repetido para cada pixel na imagem. Cada imagem possui um grande número de pixels, em geral. Pensando nisso, treinamos uma rede neural para aproximar o estimador para esse parâmetro. Uma vez treinada, a rede é alimentada com as janelas referente a cada pixel e retorna uma estimativa do parâmetro, sem a necessidade de métodos iterativos. O treino ocorre antes mesmo da obtenção dos dados do radar. O método foi testado em conjuntos de dados reais e fictícios com ótimos resultados. O mesmo método pode ser aplicado a outras distribuições. A segunda parte da tese exibe duas classes de distribuições de probabilidade obtidas a partir da composição de classes existentes. Em cada caso, apresentamos a nova classe e resultados gerais tais como expansões em série de potência para a função densidade de probabilidade, expressões para momentos, entropias e similares. A primeira classe é a composição das classes beta-G e Lehmann-tipo II. A segunda classe é obtida a partir das classes transmuted-G e Marshall-Olkin-G. Distribuições pertencentes a essas classes são comparadas a outras já existentes como maneira de ilustrar o desempenho em aplicações a dados reais.engUniversidade Federal de PernambucoPrograma de Pos Graduacao em EstatisticaUFPEBrasilAttribution-NonCommercial-NoDerivs 3.0 Brazilhttp://creativecommons.org/licenses/by-nc-nd/3.0/br/info:eu-repo/semantics/openAccessEstatísticaProbabilidadeBuilding new probability distributions: the composition method and a computer based methodinfo:eu-repo/semantics/publishedVersioninfo:eu-repo/semantics/doctoralThesisdoutoradoreponame:Repositório Institucional da UFPEinstname:Universidade Federal de Pernambuco (UFPE)instacron:UFPETHUMBNAILTESE Luis Gustavo Bastos Pinho.pdf.jpgTESE Luis Gustavo Bastos Pinho.pdf.jpgGenerated Thumbnailimage/jpeg1321https://repositorio.ufpe.br/bitstream/123456789/24966/5/TESE%20Luis%20Gustavo%20Bastos%20Pinho.pdf.jpg03b4a687d9eaca077238acb00afb2654MD55ORIGINALTESE Luis Gustavo Bastos Pinho.pdfTESE Luis Gustavo Bastos Pinho.pdfapplication/pdf3785410https://repositorio.ufpe.br/bitstream/123456789/24966/1/TESE%20Luis%20Gustavo%20Bastos%20Pinho.pdf4a1cf7340340bd8ff994a74abb62ba0eMD51CC-LICENSElicense_rdflicense_rdfapplication/rdf+xml; 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| dc.title.pt_BR.fl_str_mv |
Building new probability distributions: the composition method and a computer based method |
| title |
Building new probability distributions: the composition method and a computer based method |
| spellingShingle |
Building new probability distributions: the composition method and a computer based method PINHO, Luis Gustavo Bastos Estatística Probabilidade |
| title_short |
Building new probability distributions: the composition method and a computer based method |
| title_full |
Building new probability distributions: the composition method and a computer based method |
| title_fullStr |
Building new probability distributions: the composition method and a computer based method |
| title_full_unstemmed |
Building new probability distributions: the composition method and a computer based method |
| title_sort |
Building new probability distributions: the composition method and a computer based method |
| author |
PINHO, Luis Gustavo Bastos |
| author_facet |
PINHO, Luis Gustavo Bastos |
| author_role |
author |
| dc.contributor.authorLattes.pt_BR.fl_str_mv |
http://lattes.cnpq.br/7587599315362185 |
| dc.contributor.advisorLattes.pt_BR.fl_str_mv |
http://lattes.cnpq.br/3268732497595112 |
| dc.contributor.author.fl_str_mv |
PINHO, Luis Gustavo Bastos |
| dc.contributor.advisor1.fl_str_mv |
CORDEIRO, Gauss Moutinho |
| dc.contributor.advisor-co1.fl_str_mv |
NOBRE, Juvêncio Santos |
| contributor_str_mv |
CORDEIRO, Gauss Moutinho NOBRE, Juvêncio Santos |
| dc.subject.por.fl_str_mv |
Estatística Probabilidade |
| topic |
Estatística Probabilidade |
| description |
We discuss the creation of new probability distributions for continuous data in two distinct approaches. The first one is, to our knowledge, novelty and consists of using Estimation of Distribution Algorithms (EDAs) to obtain new cumulative distribution functions. This class of algorithms work as follows. A population of solutions for a given problem is randomly selected from a space of candidates, which may contain candidates that are not feasible solutions to the problem. The selection occurs by following a set of probability rules that, initially, assign a uniform distribution to the space of candidates. Each individual is ranked by a fitness criterion. A fraction of the most fit individuals is selected and the probability rules are then adjusted to increase the likelihood of obtaining solutions similar to the most fit in the current population. The algorithm iterates until the set of probability rules are able to provide good solutions to the problem. In our proposal, the algorithm is used to generate cumulative distribution functions to model a given continuous data set. We tried to keep the mathematical expressions of the new functions as simple as possible. The results were satisfactory. We compared the models provided by the algorithm to the ones in already published papers. In every situation, the models proposed by the algorithms had advantages over the ones already published. The main advantage is the relative simplicity of the mathematical expressions obtained. Still in the context of computational tools and algorithms, we show the performance of simple neural networks as a method for parameter estimation in probability distributions. The motivation for this was the need to solve a large number of non linear equations when dealing with SAR images (SAR stands for synthetic aperture radar) in the statistical treatment of such images. The estimation process requires solving, iteratively, a non-linear equation. This is repeated for every pixel and an image usually consists of a large number of pixels. We trained a neural network to approximate an estimator for the parameter of interest. Once trained, the network can be fed the data and it will return an estimate of the parameter of interest without the need of iterative methods. The training of the network can take place even before collecting the data from the radar. The method was tested on simulated and real data sets with satisfactory results. The same method can be applied to different distributions. The second part of this thesis shows two new probability distribution classes obtained from the composition of already existing ones. In each situation, we present the new class and general results such as power series expansions for the probability density functions, expressions for the moments, entropy and alike. The first class is obtained from the composition of the beta-G and Lehmann-type II classes. The second class, from the transmuted-G and Marshall-Olkin-G classes. Distributions in these classes are compared to already existing ones as a way to illustrate the performance of applications to real data sets. |
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2017 |
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