R Jacobian matrix

If I have an R^n --> R^m function, how can I create its Jacobian-matrix?

For instance:

expression( x^2*y, 5*x+sin(y) ) # f : R^2 --> R^2


I'd like to have a matrix of expressions like:

expression(2*x*y) expression(x^2)
expression(5) expression(cos(y))


Is there any solution?

-

At the beginning your question seem a bit vague (although we did offer more specifics later). There is a deriv function that allows simple symbolic differentiation. Since you did not offer any data at first, I assumed symbolic results were you wanted until the second comment.

ex <- expression( x^2*y, 5*x+sin(y) )
sapply(ex, deriv, c("x", "y") )
#-------result--------------------
expression({
.expr1 <- x^2
.value <- .expr1 * y
.grad <- array(0, c(length(.value), 2L), list(NULL, c("x",
"y")))
.grad[, "x"] <- 2 * x * y
.value
}, {
.value <- 5 * x + sin(y)
.grad <- array(0, c(length(.value), 2L), list(NULL, c("x",
"y")))
.value
})


Alternatively you could have use this, which would return a list of functions:

sapply(ex, deriv, c("x", "y") , func=TRUE)


[Edit 1: Answering first comment] If you want an object to allow individual matrix functions try this:

res <- sapply(ex, function(ex1) lapply(c("x","y") ,
function(arg) deriv(ex1, arg, func=TRUE) ) )

#--------------
> res[1,1]
[[1]]
function (x)
{
.value <- x^2 * y
.grad <- array(0, c(length(.value), 1L), list(NULL, c("x")))
.grad[, "x"] <- 2 * x * y
.value
}


Or for the expression version:

res <- sapply(ex, function(ex1) lapply(c("x","y") ,
function(arg) deriv(ex1, arg) ) )
#----------------------
> res[1,1]
[[1]]
expression({
.value <- x^2 * y
.grad <- array(0, c(length(.value), 1L), list(NULL, c("x")))
.grad[, "x"] <- 2 * x * y
.value
})


[Edit 2: answering second comment] To evaluate an expression, you pass it to eval with an appropriate environment:

> eval( res[1,1][[1]], envir=list(x=4,y=5) )
[1] 80