Different results using f@expr and expr // f in Mathematica

I was playing around with the `Prefix` and `Postfix` operators (`@` and `//` respectively) and I ran into the following issue.

Given the following code, they evaluate in the same exact way:

``````Hold[MatrixPlot@Sort@data] // FullForm
(* Hold[MatrixPlot[Sort[data]]] *)

Hold[data // Sort // MatrixPlot] // FullForm
(* Hold[MatrixPlot[Sort[data]]] *)
``````

However, given the following expressions, I get different results:

``````FunctionExpand@Abs'[0]
(* Abs'[0] *)

Abs'[0] // FunctionExpand
(* 0 *)
``````

I'm not quite sure really why this is. In dozens of other snippets of code I've had, `f@expr`, `expr // f`, and `f[expr]` all evaluate to the same result. Why does this one particular case give this result?

-
This link is possibly relevant: mathprogramming-intro.org/book/node174.html, where I discuss similar precedence - related issues. Using `FullForm` on original expression often helps. –  Leonid Shifrin Jul 15 '11 at 14:37
@Leonid `FullForm` is a much better way to see what's happening than what I suggested; I added this to my answer, hope you don't mind –  acl Jul 15 '11 at 14:52
@acl Great! I was typing the answer using it when your came out, so I discarded mine, voted for yours and left the link. It's good to have both approaches listed. –  Leonid Shifrin Jul 15 '11 at 15:14
The undocumented{?} function `Precedence` gives the following: `Precedence[#] & /@ {Prefix, Postfix, Infix}` -> {640., 70., 630.} –  TomD Jul 15 '11 at 15:31

This is a precedence issue. @ has higher precedence than //. To see what is going on, place the cursor on `FunctionExpand` in both cases, then either cmd+. (on OS X) or ctrl+. on anything else, and you end up selecting things by precedence.

Another way to see it is to use `Trace`:

``````FunctionExpand@Abs'[0] // Trace
(*
-> {{{FunctionExpand[Abs],Abs},Abs^\[Prime]},(Abs^\[Prime])[0]}
*)
``````

while

``````Abs'[0] // FunctionExpand//Trace
(*
-> {FunctionExpand[(Abs^\[Prime])[0]],0}
*)
``````

In particular, notice how in the first case mma first evaluates `FunctionExpand[Abs]`, obtaining `Abs`, then continuing. This is precisely due to how strongly `@` binds as compared to `//`.

EDIT: Inspired by @Leonid's comment, this is also informative:

``````Hold[FunctionExpand@Abs'[0]] // FullForm
Hold[Abs'[0] // FunctionExpand] // FullForm
(*
-> Hold[Derivative[1][FunctionExpand[Abs]][0]]
Hold[FunctionExpand[Derivative[1][Abs][0]]]
*)
``````

which is a much better demonstration of what is going on.

-
Thanks, this answers my question perfectly. –  Mike Bantegui Jul 16 '11 at 5:50