Take the 2-minute tour ×
Stack Overflow is a question and answer site for professional and enthusiast programmers. It's 100% free, no registration required.

Is it possible to define a function that holds arguments at given positions ?

Or to do something like HoldLast as a counterpart to HoldFirst ?

share|improve this question
6  
+1. I have no idea why people downvote this. –  Leonid Shifrin Aug 31 '11 at 11:08
    
Could you explain a little more your question? Maybe due to I'm not English native I'm having problems to understand your problem...therefore, I think if you give more details or explain it other way, it's possible I understand it. –  TheCharliemops Aug 31 '11 at 11:15
2  
@TheCharlieMops this is a mathematica-specific question and has to do with the way expressions get evaluated (which is probably unfamiliar to people used to java, c etc). Perhaps this reference.wolfram.com/mathematica/ref/HoldFirst.html will clarify things –  acl Aug 31 '11 at 11:32
    
Ok. Thanks for the explanation. –  TheCharliemops Aug 31 '11 at 13:34

1 Answer 1

up vote 12 down vote accepted

As far as I know, you can not do this directly in the sense that there isn't a HoldN attribute. However, below there is a work-around that should be doing what you requested.


Proposed solution

One simple way is to define an auxiliary function that will do the main work, and your "main" function (the one that will actually be called) as HoldAll, like so:

In[437]:= 
SetAttributes[f, HoldAll];
f[a_, b_, c_] :=
   faux[a, Unevaluated[b], c];
faux[a_, b_, c_] := Hold[a, b, c]

In[440]:= f[1^2, 2^2, 3^2]
Out[440]= Hold[1, 2^2, 9] 

You don't have to expose the faux to the top level, can wrap everyting in Module[{faux}, your definitions] instead.


Automation through meta-programming

This procedure can be automated. Here is a simplistic parser for the function signatures, to extract pattern names (note - it is indeed simplistic):

splitHeldSequence[Hold[seq___], f_: Hold] := List @@ Map[f, Hold[seq]];

getFunArguments[Verbatim[HoldPattern][Verbatim[Condition][f_[args___], test_]]] := 
     getFunArguments[HoldPattern[f[args]]];

getFunArguments[Verbatim[HoldPattern][f_[args___]]] := 
     FunArguments[FName[f], FArgs @@ splitHeldSequence[Hold[args]]];

(*This is a simplistic "parser".It may miss some less trivial cases*)

getArgumentNames[args__FArgs] := 
   args //. {
     Verbatim[Pattern][tag_, ___] :> tag, 
     Verbatim[Condition][z_, _] :> z, 
     Verbatim[PatternTest][z_, _] :> z
   };

Using this, we can write the following custom definition operator:

ClearAll[defHoldN];
SetAttributes[defHoldN, HoldFirst];
defHoldN[SetDelayed[f_[args___], rhs_], n_Integer] :=
   Module[{faux},
      SetAttributes[f, HoldAll];
      With[{heldArgs = 
         MapAt[
            Unevaluated,
            Join @@ getArgumentNames[getFunArguments[HoldPattern[f[args]]][[2]]],
            n]
         },
        SetDelayed @@ Hold[f[args], faux @@ heldArgs];
        faux[args] := rhs]]

This will analyze your original definition, extract pattern names, wrap the argument of interest in Unevaluated, introduce local faux, and make a 2-step definition - basically the steps we did manually. We need SetDelayed @@ .. to fool the variable renaming mechanism of With, so that it won't rename our pattern variables on the l.h.s. Example:

In[462]:= 
ClearAll[ff];
defHoldN[ff[x_,y_,z_]:=Hold[x,y,z],2]

In[464]:= ?ff
Global`ff
Attributes[ff]={HoldAll}

ff[x_,y_,z_]:=faux$19106@@Hold[x,Unevaluated[y],z]

In[465]:= ff[1^2,2^2,3^2]
Out[465]= Hold[1,2^2,9]

Notes

Note that this is trivial to generalize to a list of positions in which you need to hold the arguments. In general, you'd need a better pattern parser, but the simple one above may be a good start. Note also that there will be a bit of run-time overhead induced with this construction, and also that the Module-generated auxiliary functions faux won't be garbage-collected when you Clear or Remove the main ones - you may need to introduce a special destructor for your functions generated with defHoldN. For an alternative take on this problem, see my post in this thread (the one where I introduced the makeHoldN function).

share|improve this answer
4  
I would like to vote twice, once for the solution and once for the ambiguous variable name faux (is it f_auxiliary or the French faux = false/fake?) ;-) –  Sjoerd C. de Vries Aug 31 '11 at 13:16
    
@Sjoerd Funny - I don't know French at all (something I very much hope to remedy in this life). I must be very gifted in languages then :). Thanks for the upvote. –  Leonid Shifrin Aug 31 '11 at 13:48
4  
@Leonid, Sjoerd: That thanks could be premature. He said he'd like to vote twice. But he did not say that he voted at all (would that be a faux vote?) –  Daniel Lichtblau Aug 31 '11 at 15:19
    
@Daniel, Sjoerd Good point! –  Leonid Shifrin Aug 31 '11 at 15:38
    
Merci Leonid, many things to learn from your meta-programming here! –  Faysal Aberkane Aug 31 '11 at 16:06

Your Answer

 
discard

By posting your answer, you agree to the privacy policy and terms of service.

Not the answer you're looking for? Browse other questions tagged or ask your own question.