2

Estou estudando o metodo Vetores Autoregressivos (VAR). A parte de estimação estou entendendo, mas há uma questão que me deixa intrigada. Há uma diferenciação entre VAR e Var estrutural? Não é a mesma coisa? Pq há essa divisão?

Uma vez estimado os coeficientes eu "recupero" os verdadeiros betas do VAR "verdadeiro" que seria o Estrutural? É isso?

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0.0223601164017095, -0.0049798452207872)), .Names = c("y", "x"
), row.names = 4:355, class = "data.frame", na.action = structure(c(1L, 
2L, 3L, 356L, 357L, 358L), .Names = c("1", "2", "3", "356", "357", 
"358"), class = "omit"))

Agora rodo o VAR:

p1ct.y<- VAR(data, p = 1, type = "both") 
plot(irf(p1ct.y, impulse = "x", ci = 0.95, n.ahead = 30, response = c("y"), boot = FALSE))

A minha segunda duvida é se esse resultado da funcao impulso resposta ja considera a decomposição de Cholesky? Caso contrário, como faço para ter uma funcao impulso resposta que leve em consideração a decomposicao de cholesky?

1
  • 2
    Cara, acho que o stack overflow não é o melhor lugar para essa pergunta 12/06/17 às 20:26
0

O SVAR difere do VAR na medida em que impõe relações a esquerda do sinal de igualdade inexistente no VAR. Essas relações pretensamente advém de uma visão do funcionamento da economia e portanto há uma estrutura e por isso é dito que o SVAR é uma mirada dos dados a partir de uma teoria. Qual o problema? Com algum algebrismo vc percebe que o SVAR fica semelhante ao VAR (Chama-se forma reduzida) mas não há como estimar todas as matrizes em separado desse seu novo modelo VAR (SVAR em forma reduzida). Como resolvem? Impõem artificialmente restrições nas matrizes. Por exemplo, se vc acertou o SVAR (conhece bem como a sua economia funciona) muito provavelmente a matriz dos ruídos (ou inovações como se diz) será diagonal (diz-se que as inovações não serão cruzadas) e portanto pode ser heterocedástico mas o ruido será diagonal ao final, afinal a estrutura da economia está acertada. Outras restrições podem ser impostas, por exemplo sobre a direcionalidade entre variáveis.

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