Cópulas: uma alternativa para a estimação de modelos de risco multivariados
| Autor(a) principal: | |
|---|---|
| Data de Publicação: | 2009 |
| Tipo de documento: | Artigo |
| Idioma: | por |
| Título da fonte: | Repositório Institucional do FGV (FGV Repositório Digital) |
| Texto Completo: | http://hdl.handle.net/10438/2186 |
Resumo: | The biggest challenge in portfolio’s risk measures is to find the best way to aggregate risks. This aggregation should be done in the way where we can identify the diversification effect recognized in either asset position or portfólio. For instance, a lot of things has been done for create this definition, for example a Value at Risk (VaR) in the parametric approach uses of an assumption where all the risk factors follow the same marginal distribution, it will be a normal distribution. In this approach volatility and correlation matrix are the most important things for modeling correctly this dependence. In Historical Simulation approach, this method can be through of as estimating the distribution of the loss operator under the empirical distribution, so statistical estimation of the multivariate distribution is not necessary. In this case, the Copulas Theory provides a useful alternative because this approach allows us to create no multivariate distribution where no assumption is necessary for a neither marginal distribution or multivariate distribution. In this work, we are comparing this methodology with another risk measures approach for example: Multivariate parametric model’s VaR and an Expected Shortfall – Diagonal VEC, BEKK, EWMA, CCC, DCC – and Historical approach for VaR and ES. For this work we create a portfolio with identical position for all the factor and this factor will be: one year internal interest rate (Pré252), one year external interest rate (Cupom cambial 252), Bovespa Index, Dow Jones Index. |
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Pereira, Pedro L. VallsEscolas::EESP2009-01-26T13:25:51Z2009-01-26T13:25:51Z2009-01-26http://hdl.handle.net/10438/2186The biggest challenge in portfolio’s risk measures is to find the best way to aggregate risks. This aggregation should be done in the way where we can identify the diversification effect recognized in either asset position or portfólio. For instance, a lot of things has been done for create this definition, for example a Value at Risk (VaR) in the parametric approach uses of an assumption where all the risk factors follow the same marginal distribution, it will be a normal distribution. In this approach volatility and correlation matrix are the most important things for modeling correctly this dependence. In Historical Simulation approach, this method can be through of as estimating the distribution of the loss operator under the empirical distribution, so statistical estimation of the multivariate distribution is not necessary. In this case, the Copulas Theory provides a useful alternative because this approach allows us to create no multivariate distribution where no assumption is necessary for a neither marginal distribution or multivariate distribution. In this work, we are comparing this methodology with another risk measures approach for example: Multivariate parametric model’s VaR and an Expected Shortfall – Diagonal VEC, BEKK, EWMA, CCC, DCC – and Historical approach for VaR and ES. For this work we create a portfolio with identical position for all the factor and this factor will be: one year internal interest rate (Pré252), one year external interest rate (Cupom cambial 252), Bovespa Index, Dow Jones Index.Dentre os principais desafios enfrentados no cálculo de medidas de risco de portfólios está em como agregar riscos. Esta agregação deve ser feita de tal sorte que possa de alguma forma identificar o efeito da diversificação do risco existente em uma operação ou em um portfólio. Desta forma, muito tem se feito para identificar a melhor forma para se chegar a esta definição, alguns modelos como o Valor em Risco (VaR) paramétrico assumem que a distribuição marginal de cada variável integrante do portfólio seguem a mesma distribuição , sendo esta uma distribuição normal, se preocupando apenas em modelar corretamente a volatilidade e a matriz de correlação. Modelos como o VaR histórico assume a distribuição real da variável e não se preocupam com o formato da distribuição resultante multivariada. Assim sendo, a teoria de Cópulas mostra-se um grande alternativa, à medida que esta teoria permite a criação de distribuições multivariadas sem a necessidade de se supor qualquer tipo de restrição às distribuições marginais e muito menos as multivariadas. Neste trabalho iremos abordar a utilização desta metodologia em confronto com as demais metodologias de cálculo de Risco, a saber: VaR multivariados paramétricos - VEC, Diagonal,BEKK, EWMA, CCC e DCC- e VaR histórico para um portfólio resultante de posições idênticas em quatro fatores de risco – Pre252, Cupo252, Índice Bovespa e Índice Dow JonesporTextos para discussão - EESP ; 179Expected shortfallCopulasCópulasRiscoValor em riscoModelos multivariadosRiskValue at riskMultivariate modelsEconomiaAdministração de riscoRisco (Economia)Cópulas (Estatística matemática)Cópulas: uma alternativa para a estimação de modelos de risco multivariadosinfo:eu-repo/semantics/publishedVersioninfo:eu-repo/semantics/articlereponame:Repositório Institucional do FGV (FGV Repositório Digital)instname:Fundação Getulio Vargas (FGV)instacron:FGVinfo:eu-repo/semantics/openAccessORIGINALTD 179 Pedro Valls.pdfTD 179 Pedro 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| dc.title.por.fl_str_mv |
Cópulas: uma alternativa para a estimação de modelos de risco multivariados |
| title |
Cópulas: uma alternativa para a estimação de modelos de risco multivariados |
| spellingShingle |
Cópulas: uma alternativa para a estimação de modelos de risco multivariados Pereira, Pedro L. Valls Expected shortfall Copulas Cópulas Risco Valor em risco Modelos multivariados Risk Value at risk Multivariate models Economia Administração de risco Risco (Economia) Cópulas (Estatística matemática) |
| title_short |
Cópulas: uma alternativa para a estimação de modelos de risco multivariados |
| title_full |
Cópulas: uma alternativa para a estimação de modelos de risco multivariados |
| title_fullStr |
Cópulas: uma alternativa para a estimação de modelos de risco multivariados |
| title_full_unstemmed |
Cópulas: uma alternativa para a estimação de modelos de risco multivariados |
| title_sort |
Cópulas: uma alternativa para a estimação de modelos de risco multivariados |
| author |
Pereira, Pedro L. Valls |
| author_facet |
Pereira, Pedro L. Valls |
| author_role |
author |
| dc.contributor.unidadefgv.por.fl_str_mv |
Escolas::EESP |
| dc.contributor.author.fl_str_mv |
Pereira, Pedro L. Valls |
| dc.subject.por.fl_str_mv |
Expected shortfall Copulas Cópulas Risco Valor em risco Modelos multivariados |
| topic |
Expected shortfall Copulas Cópulas Risco Valor em risco Modelos multivariados Risk Value at risk Multivariate models Economia Administração de risco Risco (Economia) Cópulas (Estatística matemática) |
| dc.subject.eng.fl_str_mv |
Risk Value at risk Multivariate models |
| dc.subject.area.por.fl_str_mv |
Economia |
| dc.subject.bibliodata.por.fl_str_mv |
Administração de risco Risco (Economia) Cópulas (Estatística matemática) |
| description |
The biggest challenge in portfolio’s risk measures is to find the best way to aggregate risks. This aggregation should be done in the way where we can identify the diversification effect recognized in either asset position or portfólio. For instance, a lot of things has been done for create this definition, for example a Value at Risk (VaR) in the parametric approach uses of an assumption where all the risk factors follow the same marginal distribution, it will be a normal distribution. In this approach volatility and correlation matrix are the most important things for modeling correctly this dependence. In Historical Simulation approach, this method can be through of as estimating the distribution of the loss operator under the empirical distribution, so statistical estimation of the multivariate distribution is not necessary. In this case, the Copulas Theory provides a useful alternative because this approach allows us to create no multivariate distribution where no assumption is necessary for a neither marginal distribution or multivariate distribution. In this work, we are comparing this methodology with another risk measures approach for example: Multivariate parametric model’s VaR and an Expected Shortfall – Diagonal VEC, BEKK, EWMA, CCC, DCC – and Historical approach for VaR and ES. For this work we create a portfolio with identical position for all the factor and this factor will be: one year internal interest rate (Pré252), one year external interest rate (Cupom cambial 252), Bovespa Index, Dow Jones Index. |
| publishDate |
2009 |
| dc.date.accessioned.fl_str_mv |
2009-01-26T13:25:51Z |
| dc.date.available.fl_str_mv |
2009-01-26T13:25:51Z |
| dc.date.issued.fl_str_mv |
2009-01-26 |
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info:eu-repo/semantics/publishedVersion |
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info:eu-repo/semantics/article |
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article |
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publishedVersion |
| dc.identifier.uri.fl_str_mv |
http://hdl.handle.net/10438/2186 |
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http://hdl.handle.net/10438/2186 |
| dc.language.iso.fl_str_mv |
por |
| language |
por |
| dc.relation.ispartofseries.por.fl_str_mv |
Textos para discussão - EESP ; 179 |
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info:eu-repo/semantics/openAccess |
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openAccess |
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reponame:Repositório Institucional do FGV (FGV Repositório Digital) instname:Fundação Getulio Vargas (FGV) instacron:FGV |
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Repositório Institucional do FGV (FGV Repositório Digital) |
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https://repositorio.fgv.br/bitstreams/0ce2ff98-4ff9-4235-85a3-a8e7a56b9be5/download https://repositorio.fgv.br/bitstreams/1db94db9-b633-4741-b1ac-1090e2227fd9/download https://repositorio.fgv.br/bitstreams/63c03568-9746-4cb7-a1aa-db7e7037cf15/download https://repositorio.fgv.br/bitstreams/59473ed5-84ed-45e2-a5e3-a7b0b221bce2/download |
| bitstream.checksum.fl_str_mv |
f622f643c546dfd29f3a6a6af2f9ef07 92fd5d0c500340314ae923f67f3335d5 0eb64e77f8d6a7fac722c1dc604ce425 9f0f572616a8ae61de73e54221c7e9fc |
| bitstream.checksumAlgorithm.fl_str_mv |
MD5 MD5 MD5 MD5 |
| repository.name.fl_str_mv |
Repositório Institucional do FGV (FGV Repositório Digital) - Fundação Getulio Vargas (FGV) |
| repository.mail.fl_str_mv |
|
| _version_ |
1802749862690684928 |