Suppose I have a list of names of Symbols:

f1 := Print["f1 is evaluated!"];
list = {"f1", "f2"};

The obvious way to Block these Symbols leads to evaluation of them:

In[19]:= With[{list=Symbol/@list},Block[list,f1//ToString]]
During evaluation of In[19]:= f1 is evaluated!
During evaluation of In[19]:= f1 is evaluated!
Out[19]= Null

But without evaluation we could Block them without any problem:

In[20]:= Block[{f1, f2}, f1 // ToString]
Out[20]= "f1"

Is it possible to inject this list into the Block scope without evaluating the Symbols?


Disclaimer: While my response provides a solution to the problem as expressed, I do not recommend it for regular use. I offer it up because it may be of some academic interest.

From time-to-time, usually in a debugging context, I have looked longingly at Lisp's MACROEXPAND-1 and wished for a Mathematica function which applies only one level of evaluation to its argument(s). Let's call this mythical function EvaluateOnce. It would find the transformation rule applicable to the expression and apply only that rule, something like this:

In[19]:= fact[0] = 1; fact[x_] := x * fact[x - 1]
Out[19]= Hold[5 fact[5-1]]

In[20]:= f1 := Print["f1 is evaluated!"];
Out[20]= Hold[f1]

It would work on multiple expressions as well:

In[21]:= EvaluateOnce[1 + 2 * 3, Sqrt @ Sin @ Pi]
Out[22]= Hold[1+6, Sqrt[0]]

The current question could benefit from such a capability for then the solution could be expressed as:

EvaluateOnce @@ Symbol /@ Hold @@ list /.
  Hold[args__] :> Block[{args}, f1 // ToString]

Alas, there are a number of technical obstacles to writing such a function -- not least of which is a certain amount of fuzziness about what exactly constitutes a "single level of evaluation" in Mathematica. But fools rush in where angels fear to tread, so I offer this hack:

SetAttributes[EvaluateOnce, HoldAllComplete]
EvaluateOnce[exprs:PatternSequence[_, __]] :=
  Replace[Hold @@ Evaluate /@ EvaluateOnce /@ Hold[exprs], Hold[e_] :> e, 1]
EvaluateOnce[expr_] :=
  Module[{depth = 0, length = 1+Length@Unevaluated@expr, tag, enter, exit}
  , SetAttributes[exit, HoldAllComplete]
  ; enter[in_]:= If[1 === depth && 0 === length, Throw[in, tag], ++depth]
  ; exit[in_, out_] := (If[2 === depth, length--]; depth--)
  ; Hold @@ Catch[With[{r = TraceScan[enter, expr, _, exit]}, Hold[r]], tag]

This function comes without a warranty :) It uses TraceScan and some heuristics to guess when a "single level of evaluation" is complete and then uses Throw and Catch to terminate the evaluation sequence early.

The heuristics appear to work satisfactorily for function definitions whose "first level of evaluation" stays within the bounds of standard evaluation. It also fails miserably for those that don't. I'm also certain that it will get confused with the application of some evaluation attributes.

Notwithstanding these faults, I still find this function handy when trying to debug or even just understand functions with lots of standard pattern-matching definitions.

  • +1 - very interesting function, will experiment with it. I was always thinking that one can use Trace- family functions for something like this, but never came up with something useful. FWIW, I was (and am) also interested in one-step evaluation, but addressed this problem in a different way, by constructing a custom evaluator. May be, you may find my post in this thread of some interest: groups.google.com/group/comp.soft-sys.math.mathematica/… Jun 4 '11 at 19:02
  • @Leonid Thanks for the interesting link. I, too, have tried to reproduce the standard evaluator in Mma code. It's those pesky built-in definitions that make things difficult. I'd like to see WRI implement some form of partial evaluation although I confess that the feature is not particularly high on my Mma wish list.
    – WReach
    Jun 4 '11 at 19:17

Here is yet another technique to do this:

blockAlt[s : {__String}, body_] :=
   Replace[Join @@ ToHeldExpression[s], Hold[x__] :> Block[{x}, body]]

We save here on pure functions, due to the disruptive nature of rules (they don't respect other scoping constructs, including themselves)


Yet another alternative (even shorter):

SetAttributes[blockAlt1, HoldRest];
blockAlt1[s : {__String}, body_] :=
   Block @@ Append[ToHeldExpression@ToString[s], Unevaluated[body]] 
  • 4
    +1 One could re-express ToHeldExpression[s] (deprecated in V3) as ToExpression[s, InputForm, Hold].
    – WReach
    Jun 4 '11 at 15:26
  • @WReach Sure, I am well aware of that (this is what I usually do myself) - just wanted to make the code shorter :). Not too nice of me, as ToHeldExpression is indeed deprecated. Jun 4 '11 at 15:29
  • Nice! Is there any risk from that fact that ToHeldExpression says "Since Version 3.0 (released in 1996), ToHeldExpression has been superseded by ToExpression."? Well, it seems WReach beat me to it, but again, is there any risk to this? Is it going to disappear in a future version?
    – Mr.Wizard
    Jun 4 '11 at 15:30
  • 1
    @Alexey The problem is actually more general. Take Map, for example. I am pretty sure that if you set Heads->True globally, more than one feature will be broken. The solution is straightforward: pass options explicitly, but alas, almost no one does this in practice. The so widely used shortcuts @@ and @@@ don't even allow to do this. And I agree that developers must be much more careful than users. Jun 6 '11 at 7:54
  • 1
    @Alexey This is not a system defect - this is just a class of bugs, coming from carelessness (at least this is my perception of it). The practical solution for this problem is quite simple. If you develop a package say, define a private function map[f_,x_,levspec_:1]:=Map[f,x,levspec,Heads->False] and use map consistently in place of Map, and the same for other functions. But this requires more discipline. In the context of Mathematica, I am pretty sure that automatic tools similar to lint for C and FindBugs for Java could be easily developed to detect potential bugs like this. Jun 6 '11 at 9:49

You could try to use ToExpression:

In[9]:= list = {"f1", "f2"};

In[19]:= f1 = 25;

In[20]:= ToExpression[
 StringJoin["{", Riffle[list, ","], "}"], InputForm, 
 Function[vars, Block[vars, f1], HoldAll]]

Out[20]= 25
  • +1 The inner Block expression should be Block[vars, f1 // ToString] -- otherwise an unwanted evaluation will occur if f1 is defined as in the original question.
    – WReach
    Jun 4 '11 at 15:33
  • @WReach I think that here f1 is the body of Block, so its evaluation is intended. The point is that it only evaluates once, as it should. A better example would be Block[vars,Print[f1]], this indeed prints f1 as it should. Jun 4 '11 at 20:46
  • @Leonid With the original definition of f1, the example as written prints out f1 is evaluated! which the OP was trying to avoid by means of Block. Sasha's solution is correct, but I was confused at first until I realized that the printed output was generated after the ToExpression form is completely evaluated. I suggested ToString to match the original question and because others may be similarly confused (but maybe I'm the only one).
    – WReach
    Jun 4 '11 at 20:57
  • @WReach Oh I see. I think using f1 as the body of Block was probably not the best choice indeed. Jun 4 '11 at 21:28

You may consider this construct:

SetAttributes[block, HoldRest]

block[s : {__String}, body_] := 
 Function[, Block[{##}, body], HoldAll] @@ 
  Join @@ MakeExpression /@ s

Second attempt at a shorter version of Leonid's second function:

block =
  Function[, Block @@ ToHeldExpression@ToString@#~Join~Hold@#2, HoldRest]
  • 5
    It is better to set HoldRest attribute for block instead of HoldAll. +1 Jun 4 '11 at 7:11
  • @Mr.Wizard How new block should be used? I tried block[list, f1 // ToString] but it does not work with new version. Jun 5 '11 at 12:36
  • 1
    @Alexey, it seems I broke it. ;-) Or not? Does this work? list = {"f1", "f2"}; f1 := Print["Evaluated!"]; block[list, f1 // ToString] Anyway, this is just for fun.
    – Mr.Wizard
    Jun 5 '11 at 13:15
  • @Mr.Wizard It works. It seems that I just did not restart the kernel before using new definition. Nice solution! Jun 5 '11 at 14:07
  • Upon closer look, your terse version works differently, and contains a feature that I tried to avoid in mine - namely, converting the body of the Block to string. Conversion to string is not always innocent, for example, here block[{}, Hold[Print["a", "b"]]], we get back a and b as symbols, so we lose their string nature in the ToString-ToExpression cycle. In fact, I was using (constructively) exactly this loss of string quotes when I did ToString[s], but this was safe since s was a list of strings. So, sorry to bring it to you, but your version won't always work correctly. Jun 5 '11 at 16:20

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