I've heard that one of McCarthy's original motivations for inventing Lisp was to write a system for automatic differentiation. Despite this, my Google searches haven't yielded any libraries/macros for doing this. Are there any Scheme/Common Lisp/Clojure libraries (macros) out there for taking a function F and returning a function dF/dx that calculates the derivative of F?

I would want it to support F's with multiple arguments. The user would choose which of these is the x to differentiate with respect to. Ideally, the differentiator would work even for vector-valued F's and x's.

**EDIT**: Several people have mentioned symbolic differentiation. The difference between symbolic differentiation and automatic differentiation is a subtle one, but it's summarized well in Wikipedia, and particularly in this picture. This distinction isn't as strong in lisp, where symbolic expressions can be turned into working programs as-is, but there remains a potential difficulty:

Symbolic differentiation requires the expression being differentiated to be composed of operations with known derivatives. For example, someone mentioned SICP's example of a macro that churns through simple sexps like `(+ y (* (x y)))`

, and uses the chain rule, along with knowledge of how to differentiate `+`

and `*`

, to return a sexp that represents the derivative. I would need that to work with expressions like `(* (foo x y) (bar x))`

, where `foo`

and `bar`

may in turn call other functions whose derivatives aren't known at differentiation time.

This would be fine if there's a way to take an expression like `(foo x y)`

and replace it with its function body, substituting any mention of the arguments with `x`

and `y`

in a hygenic way. Is there?

Also, none of the above addresses complications that come about when differentiating vector-valued functions with respect to vector-valued arguments... which is what most autodifferentiation implementations are geared for.

symbolicaldifferentiation. Finding the deriviative of a function f at x by numerical differentiation would simply be a calculation of (f(x+dx)-f(x))/dx for some small value of dx. – Curd Feb 3 '11 at 23:29