Difference between VAR and Structural VAR and Cholesky Estimation in R

I am studying the Autoregressive Vectors (VAR) method. The pet part I am understanding, but there is a question that intrigues me. Is there a differentiation between VAR and structural Var? Isn’t it the same thing? Because there is this division?

Once estimated the coefficients I "recover" the true Betas of the "true" VAR that would be the Structural? That’s it?

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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"))

Now I spin the 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))

My second doubt is whether this result of the impulse response function already considers the decomposition of Cholesky? Otherwise, how do I have an impulse response function that takes into account cholesky decomposition?