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I have a function f[x_,y_,z_]:=Limit[g[x+eps,y,z],eps->0]; and I plot f[x,y,z] in the next step. Earlier, I used to evaluate the limit and copy the expression in the definition of f. I tried to make it all in one step. However, the evaluation of the Limit is done only when I try to plot f. As a result, every time I change around the variables and replot, the limit is evaluated all over again (it takes about a min to evaluate, so it becomes annoying). I tried evaluating the limit first, and then doing f[x_,y_,z_]:=%. But that doesn't work either. How do I get the function to evaluate the limit upon declaration?

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Use = instead of := –  Yaroslav Bulatov Mar 16 '11 at 0:20
    
what is the difference? I thought functions need to be defined using := –  user564376 Mar 16 '11 at 0:45
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No, functions can be defined with either Set (=) or SetDelayed (:=). Generally you are correct to use := for functions, but you will need to understand both of these to use Mathematica well. It would be best to post a new question if you need help understanding them, in my opinion. –  Mr.Wizard Mar 16 '11 at 1:27
    
@Mr.Wizard @Yaroslav: Is it just me or should SetDelayed[..., Evaluate[...]] be a scoping construct as I described I thought it was in the comments below my answer? Is not the syntax hilighting (for :=) a bit misleading given its current behaviour? –  Simon Mar 16 '11 at 1:56
    
@Simon The syntax highlighting breaks in quite a few contrived cases; it is by no means perfect. I suspect that your construct is not common. I'll have to think about the scoping behavior, but off hand it does not come as a surprise to me. –  Mr.Wizard Mar 16 '11 at 2:08

2 Answers 2

up vote 1 down vote accepted

An alternative to Mr Wizard's solution is that you can also put the Evaluate in the function's definition:

f[x_, y_, z_] := Evaluate[Limit[Multinomial[x, y, z], x->0]]

Plot3D[f[x, y, z], {y, 1, 5}, {z, 1, 5}]

You can compare the two versions with the one without an Evaluate by Timing the Plot.

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Simon, I did not recommend this because it only works on a toy example. It seems to me that if one can use this construct, one can also simply omit Evaluate and use Set rather than SetDelayed. There would be no need for the OP's f[x_,y_,z_]:=Limit[g[x,y,z],x->0]; in that case. No? –  Mr.Wizard Mar 15 '11 at 23:09
    
@Mr.Wizard: I always thought that the f[x_] := Evaluate[ff[x]] construct was better than a f[x_] = ff[x] because the syntax highlighting indicated local variables. But I just tested it, and they both fail the same way if you run x=1; f[x_] := Evaluate[ff[x]]; g[x_] = ff[x]... Anyway, I use this construction a lot. –  Simon Mar 15 '11 at 23:25
    
Simon, I don't understand. Why not use simply use, for example f[x_] = g[x] rather than f[x_] := Evaluate[ g[x] ] ? –  Mr.Wizard Mar 15 '11 at 23:28
    
@Mr.Wizard: No reason. I used to (before this morning) think that the variables were localised in the SetDelayed/Evaluate version, but after testing I see that it's not so. Although, I still do like the syntax highlighting that you don't get with Set. –  Simon Mar 15 '11 at 23:46
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@Simon: The confusing thing may be that the scoping constructs (Set,SetDelayed, Block, With, Module, Function) are also Mathematica expressions (heads) which (mostly) obey the standard evaluation rules. The fact that they are scoping constructs is reflected in the presence of the variable-binding stage, but that happens only when the built-in rules for them apply (which is "on the way up" in the evaluation sequence). Therefore, by wrapping Evaluate around their arguments (which is processed "on the way down"), you can manipulate their bindings, which is often a very useful capability. –  Leonid Shifrin Mar 16 '11 at 22:46

The function you need is logically called Evaluate and you can use it within the Plot command.

Here is a contrived example:

f[x_, y_, z_] := Limit[Multinomial[x, y, z], x -> 0]

Plot3D[ Evaluate[ f[x, y, z] ], {y, 1, 5}, {z, 1, 5}]

Addressing your follow-up question, perhaps all you seek is something like

ff = f[x, y, z]

Plot3D[ff, {y, 1, 5}, {z, 1, 5}]

or possibly merely

ClearAll[f, x, y, z]

f[x_, y_, z_] = Limit[Multinomial[x, y, z], x -> 0]

Plot3D[f[x, y, z], {y, 1, 5}, {z, 1, 5}]

It would be helpful if you would post a more complete version of your code.

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But will that not force the function to be evaluated every time? The way it is now, I do not need it to be evaluated each time. One evaluation is sufficient.. after that, it's just fooling around with the plot variables. –  user564376 Mar 15 '11 at 23:10
    
I don't have trouble getting the function to evaluate... I just want it to be evaluated during declaration, instead of while plotting (as if I plot multiple times, it needs to be evaluated each time). In fact, Simon's solution worked well. I haven't tried yours yet, but it seems like it would do what I have been doing. –  user564376 Mar 15 '11 at 23:16
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@d'o-o'b: Both solutions give basically the same behaviour for a single Plot command. For multiple plots, Mr.Wizard's solution would evaluate f[x,y,z] once for each plot - but that's nothing compared to once for every plot point as in your original code. –  Simon Mar 15 '11 at 23:27
    
@Simon: ah, I didn't realize mine was evaluating once for each plot point! –  user564376 Mar 15 '11 at 23:54

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